{
	"Index":186,
	"Name":"10_102",
	"RolfsenName":"10_102",
	"DTname":"10a_97",
	"TunnelNumber":2,
	"BridgeNumber":"Not implemented",
	"Hyperbolic":true,
	"Diagram":{
		"Scode":"{-9, 11, 17, 15, -19, 5, -1, 7, 3, -13}",
		"Acode":"{-5, 6, 9, 8, -10, 3, -1, 4, 2, -7}",
		"PDcode":[
			"{2, 9, 3, 10}",
			"{4, 12, 5, 11}",
			"{6, 18, 7, 17}",
			"{8, 16, 9, 15}",
			"{10, 19, 11, 20}",
			"{12, 6, 13, 5}",
			"{14, 1, 15, 2}",
			"{16, 8, 17, 7}",
			"{18, 4, 19, 3}",
			"{20, 13, 1, 14}"
		],
		"CBtype":"{3, 0}",
		"ParabolicReps":{
			"SolvingSeq":[
				"{2, 6, 10}",
				[],
				[
					"{2, 6, 3, 1}",
					"{6, 3, 7, 1}",
					"{6, -10, 5, 2}",
					"{2, -5, 1, 2}",
					"{10, 2, 9, 2}",
					"{3, 9, 4, 1}",
					"{9, 4, 8, 2}"
				],
				"{7, 10}",
				"{4}",
				4
			],
			"SolvingSeqIdx":1,
			"Comps":{
				"u":{
					"CheckEq":[
						"-a - 2*b - a*b^2 - b^3 + a*u^2 + b*u^2 + 2*a^2*b*u^2 + 4*a*b^2*u^2 + 2*b^3*u^2 - 2*a^2*u^3 - 2*a*b*u^3 + 2*a^3*b*u^3 + a^2*b^2*u^3 - a^3*u^4 - 3*a^2*b*u^4 - 3*a*b^2*u^4 - b^3*u^4 + a^2*u^5 + a^4*u^5 + a^3*b*u^5 - 2*a^5*b*u^5 - 3*a^4*b^2*u^5 + a^6*b^2*u^5 + a^5*b^3*u^5 - a^4*u^7 + 2*a^5*b*u^7 - a^6*b^2*u^7",
						"-b - b^3 + u - b*u^2 + 2*a*b^2*u^2 + 2*b^3*u^2 - 2*a*b*u^3 + a^2*b^2*u^3 + a*u^4 + b*u^4 - a^2*b*u^4 - 2*a*b^2*u^4 - b^3*u^4 - a^2*u^5 - 2*a*b*u^5 + 3*a^3*b*u^5 + 5*a^2*b^2*u^5 - 3*a^4*b^2*u^5 - 4*a^3*b^3*u^5 + a^5*b^3*u^5 + a^4*b^4*u^5 + a^2*u^7 - 3*a^3*b*u^7 + 3*a^4*b^2*u^7 - a^5*b^3*u^7",
						"-1 + a + a*u^2 + a^2*u^2 + b*u^2 - a^3*b*u^2 - a*u^4",
						"b - u^2 - a*u^2 - b*u^2 + 2*a*b*u^2 - a^2*b^2*u^2 + 2*a*u^4 + b*u^4 - a*u^6"
					],
					"TimingForPrimaryIdeals":0.140435
				},
				"v":{
					"CheckEq":[
						"-1 + a + b*v^2 - b^2*v^2 - a*b^3*v^2",
						"b - b^4*v^2",
						"-a - 2*b - a*b^2 - b^3 + v - b^4*v^3 - b^6*v^5 - a*b^7*v^5",
						"-b - b^3 - b^8*v^5"
					],
					"TimingForPrimaryIdeals":9.578500000000002e-2
				},
				"PrimaryIdeals":[
					{
						"IdealName":"J10_102_0",
						"Generators":[
							"-1198854805290174796269069297225733048622 + 2978695090046123518019671652409296415553*b + 1217620250284046131030791638556113439430*u + 686530827016759329490619888189136199450*u^2 - 22774365504322697354729177013151531679609*u^3 - 380728973691420438408624965028215021348*u^4 - 37643462985068640196549845013340290233670*u^5 - 138485883295236380703714139703541713519235*u^6 + 726504432273302233039066325092373259468038*u^7 + 523780718491813975965601899345780461368278*u^8 - 2768932502584779974602128683915220116644466*u^9 - 648524218731520541032118322615873188197609*u^10 + 4908525750826144492787576795402421579139467*u^11 - 503291088649580577224648681984204811634478*u^12 - 3197690779031864106165411486152724497554843*u^13 + 2569160258718497203981918840377133411168182*u^14 - 4306561439489349838847140058031171215051726*u^15 - 3184953974658808199411238752724033840121988*u^16 + 12321075085749790577178619435366771456132891*u^17 + 677475938713982354089901007751012966188148*u^18 - 12815447343974188917389287319697920599997862*u^19 + 3383699437666782720915881508457012596766258*u^20 + 5031403029277328589304471008197678129826064*u^21 - 6143446575602180837076861674230708505469043*u^22 + 3494499809191897686821703804489935631501288*u^23 + 6633455379413334861423478434205485286266922*u^24 - 6259607285064010373114033469513962176910762*u^25 - 5876867515243403661147252835610361147847073*u^26 + 3829429740362104734768815728956585728203912*u^27 + 4836856273441736890989251481627330258800938*u^28 - 551034944891815518792998937593398486335415*u^29 - 3666266776674827989533634751282231049161755*u^30 - 955286685067470500019152840746208365120355*u^31 + 2370435954405169185319267907676299811674167*u^32 + 911228375725792391022010976520014047785156*u^33 - 1221603920328308682985627964505520388889762*u^34 - 439899556507877381279271672059604892940988*u^35 + 477011754636387223140938725577263631547006*u^36 + 132635520790311282614561074583647290043700*u^37 - 133614777079377804429406185880578391958919*u^38 - 24426426631513311461965053756222944933594*u^39 + 24343794903508060496099481722029954922456*u^40 + 2209781961984375335845374499743041360857*u^41 - 2254835720622272406224984417999404962157*u^42",
							"25868701465956110429547241505317333064027 + 2978695090046123518019671652409296415553*a + 24168285853391356954942913844722102478574*u - 79514696633777927461961389050034100823312*u^2 - 140771000707629474480036945921890894153263*u^3 - 507076998081907122679576598324843582595748*u^4 - 117867623657268330744326267088976097572951*u^5 + 3075901416664740993472232176380068272617965*u^6 + 1805143338217050840061091917967764016060142*u^7 - 7515356298459668479983401879531531133055641*u^8 - 4867957242232310544980183904142515135608093*u^9 + 9115018761868452691444477059897989356131424*u^10 + 5637504364970080027467769094943949925025222*u^11 - 1829436308173815083029473157680493819229800*u^12 + 313189509259431928245608968753140349119301*u^13 - 12936199144679584981260846315301290448650986*u^14 - 11029218270203521773975697131423555726479596*u^15 + 23771142416438522117394251578950790410223271*u^16 + 16565258119601273052049008779634857688413711*u^17 - 21009799406488980207057689765945341988374868*u^18 - 9216255189309030793725196273436104228496471*u^19 + 8176860695277221187135144823334364488959374*u^20 - 6810459540722489335816334993773036024965807*u^21 + 2270998727074353664142585341241352583614775*u^22 + 19464618640964468168394631156263920066788720*u^23 - 3109885453502955416917588763099539201829626*u^24 - 21515765935648545423548589191257611809400855*u^25 - 2326460166123937753491567330947143329880578*u^26 + 15482165714515398875308963705515875232116959*u^27 + 6892232913601543432247954159905766543138265*u^28 - 7979029042109535133264603433568121578705186*u^29 - 7336002853856078104525489852488213811042346*u^30 + 3008741306585612830165639573636619894483079*u^31 + 5019856390628730546837768871860985799073597*u^32 - 822030909065651580273278709232389353990961*u^33 - 2458046430288579637604114484175750176030820*u^34 + 156433988933183380148149547625160923473751*u^35 + 879148498884321458787441082986613753075856*u^36 - 19222148594247901699712818599891861192561*u^37 - 223986641183559464082841619229151887707879*u^38 + 1241506917976550987387250942860857581274*u^39 + 37277123518136395426397940905331844710909*u^40 - 4110863666494457866973758548878858328*u^41 - 3168866635046878855967124694015278634766*u^42",
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43"
						],
						"VariableOrder":[
							"b",
							"a",
							"u"
						],
						"Characteristic":0,
						"KnownGroebner":[],
						"Status":[
							"vCompNormalize"
						],
						"MonomialOrder":"lex",
						"IsHomogeneous":false,
						"IsZeroDim":true,
						"IdealDimension":0,
						"Timings":{
							"TimingGroebner":9.1503e-2,
							"TimingZeroDimVars":0.174817,
							"TimingmagmaVCompNormalize":0.176292,
							"TimingNumberOfSols":0.445335,
							"TimingIsRadical":0.101875,
							"TimingArcColoring":0.118904,
							"TimingObstruction":0.300184,
							"TimingComplexVolumeN":3.2764578e1,
							"TimingaCuspShapeN":0.471437,
							"TiminguValues":0.729492,
							"TiminguPolysN":0.327847,
							"TiminguPolys":1.439922,
							"TimingaCuspShape":0.274545,
							"TimingRepresentationsN":0.440241,
							"TiminguValues_ij":0.347686,
							"TiminguPoly_ij":5.070054,
							"TiminguPolys_ij_N":0.861829
						},
						"ZeroDimensionalVars":[
							"b",
							"a",
							"u"
						],
						"NumberOfSols":43,
						"IsRadical":true,
						"ArcColoring":[
							[
								"(-26882196010295373814542076406237184285218 - 26588321410523200232922204461997876336271*u + 77426777438753866439759769898337402572149*u^2 + 182242088975474793357754039047543672585990*u^3 + 538794580931041044640221018149168561758971*u^4 + 134852128919915289738544469793375708366552*u^5 - 3089775094696958355693803195041894737666085*u^6 - 2647844803450579656644332035223830127496281*u^7 + 7408068343802447814249251171286361943026295*u^8 + 7872191227009295579217404991404276571467214*u^9 - 9106512897199909917157412395163121269309994*u^10 - 10402222505353937640366433596021113933521026*u^11 + 2622702995750105015632950273485961655203118*u^12 + 1946482519715529291006738013318295817451811*u^13 + 11190361995039965763214365038247761548342836*u^14 + 16368971256158985465946424857518109975840230*u^15 - 22463981783894560931576408570443796473092282*u^16 - 28671750686701187698554181642047654752725757*u^17 + 22058435207446962348770342056125849924829791*u^18 + 20300322760866374924877508371393739623828318*u^19 - 11984136152881690040269419876077407946179501*u^20 + 3814664326696304591668267037743740212254212*u^21 + 3045200601584150040007533210398585928874855*u^22 - 24118872570469800358519149068350127856268999*u^23 - 2369637518453031505199658585055020885637059*u^24 + 28043071212607411757106276700961731332948473*u^25 + 7414628204098787064600468416540899602987133*u^26 - 19346611264765045354184634013422678803629216*u^27 - 11353504938791576382079152609462734104934387*u^28 + 8725272628723384038669474795338508204069126*u^29 + 10809973902153618126079371733489513361107074*u^30 - 2349016501692603527601523376634347650745701*u^31 - 7247538933666066674836812164274129276298847*u^32 + 137594984919883130850307855170951732687620*u^33 + 3577109510345318736379290493592706581556777*u^34 + 174327258993154884013933478948493047972632*u^35 - 1302727342697128420932434612293574871235339*u^36 - 79101254935232686006747316398195181126004*u^37 + 338889603760627456909870123454577327123113*u^38 + 16499053668494168225932973434313614976761*u^39 - 57554558658831699025346561171218062115693*u^40 - 1557226231367954250982727076920395708729*u^41 + 4981686427181120340042829770575147919120*u^42)\/2978695090046123518019671652409296415553",
								"(651012254594989472414203362676309702756 - 7914124566259102330923701793005392266778*u - 2535738581736758392250908456185949849570*u^2 + 32922192786480270343332963251614987275036*u^3 + 12315249032375011017404616014408919822012*u^4 + 149533926129917770742623052239023000562869*u^5 + 42792804080066880755254305699412702676594*u^6 - 1192477093556087460365506619816097183998085*u^7 - 142447414043911010844819907438028664682876*u^8 + 3437734453871074739146624709949656740861322*u^9 - 105201270280576057158121769026519277303607*u^10 - 4894258540986116629954618105368657792068769*u^11 + 1090065210927705452479530515472222629069182*u^12 + 1746900148229691305161845808679032868655845*u^13 - 2020680322551171257011041463172876308030268*u^14 + 6431117859024570953489278347832727365419686*u^15 + 1271159683168493606432081041203630282646808*u^16 - 13243349721762136966079191291143097329758456*u^17 + 1488206518194778253748870025704813754933584*u^18 + 11664429467821050586427595443608600294599302*u^19 - 4483588220224189153956271913237708328575262*u^20 - 2851801886207605199521338944679217491936023*u^21 + 6009737715758246210344023056646210164457996*u^22 - 5183207268758466061213471568968124454806589*u^23 - 6085530991323194176646416569486805540726396*u^24 + 6989407537678163935553304702000029703414654*u^25 + 5598274694725549658620839560380702788518065*u^26 - 4059642184508915920731919672657547241273737*u^27 - 4872455289389674089647719870392371177204264*u^28 + 741273385172376849446066663400541145541066*u^29 + 3767185592992082859513988865417020633031288*u^30 + 725500853639910002209115662512628135775371*u^31 - 2400148496042096122582150368857635687822065*u^32 - 733057377950722210198512780583806033950900*u^33 + 1199172880852061782074505303510654973467862*u^34 + 351446501985405827498716311191218228465699*u^35 - 451909760432944052622109037489659523918964*u^36 - 104018335619689346049461712318850286196313*u^37 + 122160564806367535772962321144932606696622*u^38 + 18714430868808277320061445217098734883447*u^39 - 21499242011544392407648827819588755860280*u^40 - 1643929420892591919871859312730589040449*u^41 + 1918418293403625132109119994271749685267*u^42)\/2978695090046123518019671652409296415553"
							],
							"{1, 0}",
							[
								1,
								"u^2"
							],
							[
								"(-7479010014477585539781411104635520832932 + 21985510007601375167054604299936908043548*u + 64480935496126938151545165159012133086868*u^2 - 79932928828045795714518795779194129561463*u^3 + 117371820311483842549276616814129869148199*u^4 - 405621185891281099079283830929667990873372*u^5 - 1435846750067743673490085242945586638971300*u^6 + 3063106388693819581137848497378767479142413*u^7 + 3766370557890433774178965911305959752625050*u^8 - 8220062346492747583540553277292314043305551*u^9 - 3729170283822784256712799657194638586476982*u^10 + 10516062589250980587148147557417026444681096*u^11 - 2386332260226388070497244224476718259203018*u^12 - 1946239366179942839855199136596470445080334*u^13 + 11294613649722129032007111323398841316461998*u^14 - 16019149046918453217251797904146734641586904*u^15 - 13365489077030371600314935669419570428062250*u^16 + 28578545411240681288275196502502476714625782*u^17 + 4162674042025249288782752229631612640951320*u^18 - 23511343158093651137300011756924255917604413*u^19 + 9325476719256419445607167326696961929303031*u^20 + 6402591467623301543324946285597045852408576*u^21 - 17308026836317685630343352535348176619331794*u^22 + 6770814462182655724470894159348158331763437*u^23 + 17314808161886757839818908712148123586189526*u^24 - 8078872774713863448924488869258156754803819*u^25 - 13366434324487600707921817903121698627890054*u^26 + 2415513147731022416352271104550597288416435*u^27 + 9306132350377830104513249720719642813937827*u^28 + 2287713344859362765509855191323213363991550*u^29 - 6133394598288842619506483621257404464512494*u^30 - 3237331634703342382474450110367539447269453*u^31 + 3618295120210225438746502167766509184938698*u^32 + 2074255392529744475757324744188703503324406*u^33 - 1756016357788227167247780461557308170935088*u^34 - 845607228259275550819877052670448040356837*u^35 + 654374280676267508523519277940961424277372*u^36 + 228385064512493544879200975626923560442654*u^37 - 175332794766889014897742184304985225740969*u^38 - 38425854663108573706453364975700744464109*u^39 + 30464536847137438904713697625369512511357*u^40 + 3160073030779372870798558416502074022517*u^41 - 2655472464920791290287357917350695121746*u^42)\/2978695090046123518019671652409296415553",
								"(4700758976113951192759524263835467831529 + 22735584329332151734533105886566632889568*u + 19658389965564136854096033131644446101106*u^2 - 93412075145940267201157285540400983960536*u^3 - 121185829758306852772878380805415192664292*u^4 - 369109348283541797704293430834841858843237*u^5 + 148821827673190957618914832348588805731919*u^6 + 2829806304555227730477550853015381619525670*u^7 - 266151187072615897252694348861872077138815*u^8 - 7329838389942135055516041582360682474665228*u^9 + 1279631347892955517043980981038602457788477*u^10 + 8743069315631097030495498829026303757125746*u^11 - 3132448880256235463179135834573994846093216*u^12 - 344330965485542795374438060383684544077520*u^13 + 3165258112964629820726633965312436661453010*u^14 - 15437165486059847762242565407903078126469560*u^15 + 942961194246278874579004975254140879637027*u^16 + 24833251121929802301439464899577446367129662*u^17 - 7075663087337207585479120361031800584144194*u^18 - 17751047916963079468610920923653088392260644*u^19 + 10676044195704023858616674573035608063747718*u^20 + 401045814260682916014260007855766716520643*u^21 - 10546764808831349358212299191944078805187111*u^22 + 12346055857127871886110007861938980698284090*u^23 + 9228155076859199655484249715902859811592024*u^24 - 13438821364173222225064912959835361812386618*u^25 - 8648077766173932184341485261849430268895801*u^26 + 7443329249107093903501746179848360540583500*u^27 + 8138828461701049621361208740216808552189779*u^28 - 1757392475484226761962160083706291629906103*u^29 - 6571785929756383379090340288267010037179176*u^30 - 647477593479722878186975337952465426855757*u^31 + 4185814416606959947517886104823873285119351*u^32 + 798576774681374914404021046724102989269289*u^33 - 2035590632678123383813842684736540678334332*u^34 - 375623005012728533410716023462597321895382*u^35 + 736558818300106659528771813204087760500418*u^36 + 104591533427539525886211027394706571371703*u^37 - 189848277427947359127471179510681970470433*u^38 - 17228216411432087839876840270343856393892*u^39 + 31714048033720410459953123238326847426086*u^40 + 1327149009410970970372491832926109136716*u^41 - 2659691469328338691291692672330454379137*u^42)\/2978695090046123518019671652409296415553"
							],
							[
								"(32272524041011972926649045653674815903786 + 10628333554858352145674547180610904723104*u - 106628010902123028843278088432644521406773*u^2 - 104953631976387295775647715366778111258546*u^3 - 573666747872102900869804943062931539306114*u^4 + 51350791032687709291496910163441740714461*u^5 + 3707861748254780505571166504915775172449334*u^6 + 721334670251340099884803788647783340262229*u^7 - 9138774226822631378104841071949819066694265*u^8 - 2126612246687397012929797198024671371938800*u^9 + 10852018412143298820486012352291031483340919*u^10 + 2029564281139097295169477518097252676400070*u^11 - 1205253604740116879757518937907029286088552*u^12 + 1570976017734458788103370673157169569317154*u^13 - 17402740187879283174231982409831985574562582*u^14 - 6497795179035576341248911941909151659410762*u^15 + 29780073826687590514808802992299163343698466*u^16 + 6814991276584296548009367079273615160937722*u^17 - 23864225848850568618940382117484669943118605*u^18 + 407965364166302577002929447674361571973372*u^19 + 5424431090698235028481412291793579482264564*u^20 - 11145789075208246757276041287613446178649353*u^21 + 8874357307998723649604006412737024665980692*u^22 + 18399090925508462983980828531383299733706295*u^23 - 10129503850477729464263148844361385933136895*u^24 - 18873947959516847510697669211681884607246570*u^25 + 3104298987790269894622019542045289113814080*u^26 + 14418044748477296903465698746106600716527922*u^27 + 3207012013527766708995076965399730724418550*u^28 - 8758334922345572758133881815849508506647377*u^29 - 4924453312395244186166632075655021337985801*u^30 + 4345753146645998198082501703318842723447748*u^31 + 3548538086411393700240305937862160605616736*u^32 - 1764891477560913065412863315021361772268561*u^33 - 1699330187534525244295060739769489061687819*u^34 + 572463254840215784597595455533573706304155*u^35 + 575629712193334599148077571291886413970830*u^36 - 140363539861467512392496574242042158923275*u^37 - 136337656638605173593806109931030378104446*u^38 + 23282687069772672929517151596084620700479*u^39 + 20809551032975892117265681702304629341723*u^40 - 2002451931420525376375479078326576045576*u^41 - 1591589386263198731889249368368393765379*u^42)\/2978695090046123518019671652409296415553",
								"(-802279266643283137825254251137500506817 + 9470341397815001139382950086198479644222*u + 2841486085106030327105908673891847049437*u^2 - 42737466688844189522655618580500366829011*u^3 - 2168185356474199002923808386301739391259*u^4 - 118324634714700083736051832747984473572135*u^5 - 130054720618411761211589230472971726587642*u^6 + 1035634979462375327865696481516299726134598*u^7 + 342401402846258744978888885903770956073105*u^8 - 2878235764569534330202324158263638884321842*u^9 - 109921175818691799546022547462575009222477*u^10 + 3824711410398702809001175797225969599267230*u^11 - 1042687351206460051223876870802150386805456*u^12 - 972286361678797202211896375402610613608940*u^13 + 2162137436542084616895543069445592716119932*u^14 - 5485522529981292246217898884251037634800132*u^15 - 1528801892662237883763087632647436963497227*u^16 + 10357263144709207589807806422562416890519438*u^17 - 1080398739232561779311456216811236557258035*u^18 - 8722203626085721266609371593371965691404381*u^19 + 3803980551497753677391523459605174444753055*u^20 + 1974822131533177850323692680819604464180597*u^21 - 5028806137094124061307575371635732508831904*u^22 + 3851041453964052710899506118142129692889942*u^23 + 4883824855263266063196315430448382294438232*u^24 - 5007969810890205309043790126475499545091656*u^25 - 4303162513444895320715316779729587638914970*u^26 + 2800997646980312579326475607850312729550527*u^27 + 3650743247220669132686388077775938995073532*u^28 - 417489699198023714800148207334731989085611*u^29 - 2798902960419847912000351110528173055847948*u^30 - 589431763816466050444351015577718527055596*u^31 + 1781820028322196473516868103248838622931591*u^32 + 554745151198163204224777903161360699995302*u^33 - 891681638256451784793893696362501455077423*u^34 - 260854468168520561126732200159140588244968*u^35 + 336860120864954000635005672125560608353275*u^36 + 76510454857383129040841944843221055310592*u^37 - 91398519433095244951794807930659875481126*u^38 - 13700455387451457191298966613223114737254*u^39 + 16174454344679515823675671370054310649343*u^40 + 1204391669184789639554559582168834796150*u^41 - 1459273520102601932531299460760204538247*u^42)\/2978695090046123518019671652409296415553"
							],
							[
								0,
								"u"
							],
							[
								"-u",
								"u - u^3"
							],
							[
								"(-31022033900157828372456953769516704914282 - 14631405232927249771334989324599636126400*u + 124352053497661051337644466091655860317049*u^2 + 132274918544672289896585099562464445090503*u^3 + 509466326423154510319735380168990382186536*u^4 - 4946298087855869691163904025771099205277*u^5 - 3895778960838900543129950335177195364516762*u^6 - 1029804288964942054216057801405979008323491*u^7 + 10607634533742881227962532513767474510151128*u^8 + 2602842137094847811754547657093057350166430*u^9 - 14205458850630536422169477713759088868442337*u^10 - 1914226924789776542530384828680697739999482*u^11 + 4227424968338721221305411825329873010390736*u^12 - 2944760866052445971764906951869006949448568*u^13 + 19119677225120545907690918097365423188413728*u^14 + 8485567524329555539643163382844611425489730*u^15 - 37558766452419206357615454202062387953044112*u^16 - 7644213327489981129417796237577175110753712*u^17 + 32955378112334312215579912594378959093585617*u^18 - 1882982127695787063084282830018770741075087*u^19 - 9623466452302550326950051914594243258179820*u^20 + 14526476783115611080937017713539781906156855*u^21 - 10787999862413926594959184215661677424751042*u^22 - 22514308814101332943103560375094550256927401*u^23 + 14388536389851479539093989521281282406131726*u^24 + 22852439762322166039803319963929114050244772*u^25 - 5878293332281710175975854249182621295662420*u^26 - 17831894565995299995462498628119897851088453*u^27 - 2758375547571045643110020252601423825120206*u^28 + 11351166206411159562259664760839702112240211*u^29 + 5626546377534911233497869671182367834839855*u^30 - 5999447444889329309197042696349537279169939*u^31 - 4258205796371646845032246027306349810615740*u^32 + 2605939247826343867069686215580048109557205*u^33 + 2061578305926585066095600657412870234858397*u^34 - 898217397393847617751069694186833509944501*u^35 - 693662296034187988397366936116889552906642*u^36 + 231336557275334214146476680787777163468487*u^37 + 161121982369990829608431351721755666546600*u^38 - 39866912927634898556760380687133806779529*u^39 - 23821720429711441587732991069695601780598*u^40 + 3543641442949455990515555274794917651222*u^41 + 1730168525389244701601031596447123975387*u^42)\/2978695090046123518019671652409296415553",
								"(2068016038740234900044861815875563759742 + 2133464287694215444042946728005538420814*u + 11117972568120764493645802417968212863697*u^2 + 6627055889612824139208790728748792438135*u^3 - 63341685801822544172299986365641158670269*u^4 + 49320612842644245300218262365644734535554*u^5 - 49740734430188762248985679647929620025800*u^6 - 177688917640856725710891247682417838003373*u^7 + 772867498646951980142180441857626683015745*u^8 - 164810264577637718177172171391415540603522*u^9 - 1810678237157092609191644606535430271507175*u^10 + 1484704818747072507424925860111585571735482*u^11 + 1436790567575636931944229002653423760729594*u^12 - 2517459956330693636883438490750330568096030*u^13 + 1403617585278946275776449538938901551483918*u^14 + 937193746701968501877434368252790902040060*u^15 - 4553043340845361532947229203266289461644108*u^16 + 2899125810704523138736995357371814452883176*u^17 + 4549114524547998277109039550205819059369837*u^18 - 5347471890515750424378320481427484002907023*u^19 - 1134040314245274397603170656167565864646421*u^20 + 4139638453774092742217444674345596182538302*u^21 - 2495024145601370314985241485465690168376850*u^22 - 1185752827707670335208807444901319225784549*u^23 + 3745334152186611424398604679925824470528435*u^24 - 443754957130286550504697765784356142413814*u^25 - 2934926237954619635211084348161915887219656*u^26 + 129177731277674676792889622422689056522283*u^27 + 1699261825985928708089045137015503769765375*u^28 + 711450355928696607940834727923020600432054*u^29 - 919711791734215247640695514852620867231385*u^30 - 968377651319083891530370911390845517212242*u^31 + 535248636529329326088605082491599131876850*u^32 + 676261602685941479238308787470725142620761*u^33 - 298690711989959624824731253150614818192251*u^34 - 303572645219750447980105026767300234374093*u^35 + 133177716597228144417558727448803674813383*u^36 + 90460980688196661173320798912045372168362*u^37 - 42277983046321498538827745773542844619388*u^38 - 16858328562708953679825104191707036332891*u^39 + 8553631829094076709348103183039416108581*u^40 + 1563805750440504131653044046957473912176*u^41 - 868483663896477539077749629343369423845*u^42)\/2978695090046123518019671652409296415553"
							],
							[
								"(-24669846660665935633278172208091600015405 - 25385906103675403085973705483278215918004*u + 78828165806761168132470769161844964623862*u^2 + 163545366211952171834766122935042425832872*u^3 + 507457727055598543117985223289871797617096*u^4 + 155511086642336970940876112102316387806621*u^5 - 2937415533369504612768518036676526559098730*u^6 - 2531647770490353073100158243060137275528180*u^7 + 6991575579967854504017799980185750671687363*u^8 + 7636889744817090519582312588057735252252559*u^9 - 8466494543136932150412358737282116167933815*u^10 - 10546030115796224520255345890346371504164689*u^11 + 2332727396823395660254121839664698630864278*u^12 + 2884501269772432177919802517399584148435542*u^13 + 10367038885961087777278927474924157037482804*u^14 + 15335779709692871612822837189454726941531322*u^15 - 20586188441779713917983012826226756570101283*u^16 - 28886333205351063629227628215001629144546602*u^17 + 20332323467774997852967788758194329022186720*u^18 + 22031702533283219711114483593134024828494333*u^19 - 11560560132944003908051026331791377085725632*u^20 + 1779056511445160746511863985575357895139743*u^21 + 3872447848527827172934276332989355921854268*u^22 - 22959118450156365855216334960753855698290008*u^23 - 3523569925910379444505889671105946084437296*u^24 + 27775373220712555796662622660771573986311617*u^25 + 8203327681367341414638820166557504477727651*u^26 - 19311595454877503610077779434472460960320871*u^27 - 11729089187043280323237205641533096801939203*u^28 + 8530063987001350652057602371161520065040601*u^29 + 11002269630530906094059124603770444860204101*u^30 - 2053454621518142330146486732890411529362724*u^31 - 7390292345033899732157036779537285610747764*u^32 - 89197466660140810748732267287624693794195*u^33 + 3679650350616888320589742448681270564920582*u^34 + 283465567574694001131122124434443969467237*u^35 - 1356160253520708681928379808563877384622862*u^36 - 113413372196063380914848255983755428851139*u^37 + 357601418262937268512247805109730279666798*u^38 + 23184919713536760474577802813362087352320*u^39 - 61620918421644455922497422627361799633365*u^40 - 2205671098317880877978400741194162502529*u^41 + 5423702355669151262192109112014683596923*u^42)\/2978695090046123518019671652409296415553",
								"(1198854805290174796269069297225733048622 - 1217620250284046131030791638556113439430*u - 686530827016759329490619888189136199450*u^2 + 22774365504322697354729177013151531679609*u^3 + 380728973691420438408624965028215021348*u^4 + 37643462985068640196549845013340290233670*u^5 + 138485883295236380703714139703541713519235*u^6 - 726504432273302233039066325092373259468038*u^7 - 523780718491813975965601899345780461368278*u^8 + 2768932502584779974602128683915220116644466*u^9 + 648524218731520541032118322615873188197609*u^10 - 4908525750826144492787576795402421579139467*u^11 + 503291088649580577224648681984204811634478*u^12 + 3197690779031864106165411486152724497554843*u^13 - 2569160258718497203981918840377133411168182*u^14 + 4306561439489349838847140058031171215051726*u^15 + 3184953974658808199411238752724033840121988*u^16 - 12321075085749790577178619435366771456132891*u^17 - 677475938713982354089901007751012966188148*u^18 + 12815447343974188917389287319697920599997862*u^19 - 3383699437666782720915881508457012596766258*u^20 - 5031403029277328589304471008197678129826064*u^21 + 6143446575602180837076861674230708505469043*u^22 - 3494499809191897686821703804489935631501288*u^23 - 6633455379413334861423478434205485286266922*u^24 + 6259607285064010373114033469513962176910762*u^25 + 5876867515243403661147252835610361147847073*u^26 - 3829429740362104734768815728956585728203912*u^27 - 4836856273441736890989251481627330258800938*u^28 + 551034944891815518792998937593398486335415*u^29 + 3666266776674827989533634751282231049161755*u^30 + 955286685067470500019152840746208365120355*u^31 - 2370435954405169185319267907676299811674167*u^32 - 911228375725792391022010976520014047785156*u^33 + 1221603920328308682985627964505520388889762*u^34 + 439899556507877381279271672059604892940988*u^35 - 477011754636387223140938725577263631547006*u^36 - 132635520790311282614561074583647290043700*u^37 + 133614777079377804429406185880578391958919*u^38 + 24426426631513311461965053756222944933594*u^39 - 24343794903508060496099481722029954922456*u^40 - 2209781961984375335845374499743041360857*u^41 + 2254835720622272406224984417999404962157*u^42)\/2978695090046123518019671652409296415553"
							],
							[
								"(-25868701465956110429547241505317333064027 - 24168285853391356954942913844722102478574*u + 79514696633777927461961389050034100823312*u^2 + 140771000707629474480036945921890894153263*u^3 + 507076998081907122679576598324843582595748*u^4 + 117867623657268330744326267088976097572951*u^5 - 3075901416664740993472232176380068272617965*u^6 - 1805143338217050840061091917967764016060142*u^7 + 7515356298459668479983401879531531133055641*u^8 + 4867957242232310544980183904142515135608093*u^9 - 9115018761868452691444477059897989356131424*u^10 - 5637504364970080027467769094943949925025222*u^11 + 1829436308173815083029473157680493819229800*u^12 - 313189509259431928245608968753140349119301*u^13 + 12936199144679584981260846315301290448650986*u^14 + 11029218270203521773975697131423555726479596*u^15 - 23771142416438522117394251578950790410223271*u^16 - 16565258119601273052049008779634857688413711*u^17 + 21009799406488980207057689765945341988374868*u^18 + 9216255189309030793725196273436104228496471*u^19 - 8176860695277221187135144823334364488959374*u^20 + 6810459540722489335816334993773036024965807*u^21 - 2270998727074353664142585341241352583614775*u^22 - 19464618640964468168394631156263920066788720*u^23 + 3109885453502955416917588763099539201829626*u^24 + 21515765935648545423548589191257611809400855*u^25 + 2326460166123937753491567330947143329880578*u^26 - 15482165714515398875308963705515875232116959*u^27 - 6892232913601543432247954159905766543138265*u^28 + 7979029042109535133264603433568121578705186*u^29 + 7336002853856078104525489852488213811042346*u^30 - 3008741306585612830165639573636619894483079*u^31 - 5019856390628730546837768871860985799073597*u^32 + 822030909065651580273278709232389353990961*u^33 + 2458046430288579637604114484175750176030820*u^34 - 156433988933183380148149547625160923473751*u^35 - 879148498884321458787441082986613753075856*u^36 + 19222148594247901699712818599891861192561*u^37 + 223986641183559464082841619229151887707879*u^38 - 1241506917976550987387250942860857581274*u^39 - 37277123518136395426397940905331844710909*u^40 + 4110863666494457866973758548878858328*u^41 + 3168866635046878855967124694015278634766*u^42)\/2978695090046123518019671652409296415553",
								"(1198854805290174796269069297225733048622 - 1217620250284046131030791638556113439430*u - 686530827016759329490619888189136199450*u^2 + 22774365504322697354729177013151531679609*u^3 + 380728973691420438408624965028215021348*u^4 + 37643462985068640196549845013340290233670*u^5 + 138485883295236380703714139703541713519235*u^6 - 726504432273302233039066325092373259468038*u^7 - 523780718491813975965601899345780461368278*u^8 + 2768932502584779974602128683915220116644466*u^9 + 648524218731520541032118322615873188197609*u^10 - 4908525750826144492787576795402421579139467*u^11 + 503291088649580577224648681984204811634478*u^12 + 3197690779031864106165411486152724497554843*u^13 - 2569160258718497203981918840377133411168182*u^14 + 4306561439489349838847140058031171215051726*u^15 + 3184953974658808199411238752724033840121988*u^16 - 12321075085749790577178619435366771456132891*u^17 - 677475938713982354089901007751012966188148*u^18 + 12815447343974188917389287319697920599997862*u^19 - 3383699437666782720915881508457012596766258*u^20 - 5031403029277328589304471008197678129826064*u^21 + 6143446575602180837076861674230708505469043*u^22 - 3494499809191897686821703804489935631501288*u^23 - 6633455379413334861423478434205485286266922*u^24 + 6259607285064010373114033469513962176910762*u^25 + 5876867515243403661147252835610361147847073*u^26 - 3829429740362104734768815728956585728203912*u^27 - 4836856273441736890989251481627330258800938*u^28 + 551034944891815518792998937593398486335415*u^29 + 3666266776674827989533634751282231049161755*u^30 + 955286685067470500019152840746208365120355*u^31 - 2370435954405169185319267907676299811674167*u^32 - 911228375725792391022010976520014047785156*u^33 + 1221603920328308682985627964505520388889762*u^34 + 439899556507877381279271672059604892940988*u^35 - 477011754636387223140938725577263631547006*u^36 - 132635520790311282614561074583647290043700*u^37 + 133614777079377804429406185880578391958919*u^38 + 24426426631513311461965053756222944933594*u^39 - 24343794903508060496099481722029954922456*u^40 - 2209781961984375335845374499743041360857*u^41 + 2254835720622272406224984417999404962157*u^42)\/2978695090046123518019671652409296415553"
							]
						],
						"Obstruction":-1,
						"ComplexVolumeN":[
							"3.68686 + 3.98038*I",
							"3.68686 - 3.98038*I",
							"8.42806 - 4.73173*I",
							"8.42806 + 4.73173*I",
							"8.00794 - 0.59552*I",
							"8.00794 + 0.59552*I",
							"-1.78551 + 0.79823*I",
							"-1.78551 - 0.79823*I",
							"0.85124 - 2.72416*I",
							"0.85124 + 2.72416*I",
							"8.79687 + 1.11797*I",
							"8.79687 - 1.11797*I",
							"6.04283 - 2.22576*I",
							"6.04283 + 2.22576*I",
							"8.42175 + 3.77684*I",
							"8.42175 - 3.77684*I",
							"0.60187 + 3.31941*I",
							"0.60187 - 3.31941*I",
							"-3.24498 - 4.34665*I",
							"-3.24498 + 4.34665*I",
							"-1.93492 + 0.03968*I",
							"-1.93492 - 0.03968*I",
							"10.4257 - 7.06955*I",
							"10.4257 + 7.06955*I",
							"2.55744 + 7.03361*I",
							"2.55744 - 7.03361*I",
							"-1.44466 + 3.00552*I",
							"-1.44466 - 3.00552*I",
							"1.98226 - 3.31409*I",
							"1.98226 + 3.31409*I",
							"0.51328 - 9.3893*I",
							"0.51328 + 9.3893*I",
							"7.5587 + 13.7273*I",
							"7.5587 - 13.7273*I",
							2.69846,
							"1.65782 - 2.65936*I",
							"1.65782 + 2.65936*I",
							"3.92762 - 3.88689*I",
							"3.92762 + 3.88689*I",
							"-0.163307 + 1.12842*I",
							"-0.163307 - 1.12842*I",
							"2.85108 - 0.00109*I",
							"2.85108 + 0.00109*I"
						],
						"uPolysN":[
							"419 - 1000*u - 1869*u^2 + 7315*u^3 + 486*u^4 - 24151*u^5 + 16003*u^6 + 48821*u^7 - 60200*u^8 - 67786*u^9 + 132027*u^10 + 63487*u^11 - 214160*u^12 - 24292*u^13 + 277370*u^14 - 45310*u^15 - 294429*u^16 + 120352*u^17 + 257837*u^18 - 167067*u^19 - 187210*u^20 + 167009*u^21 + 115171*u^22 - 130179*u^23 - 63529*u^24 + 82800*u^25 + 33892*u^26 - 44940*u^27 - 17679*u^28 + 21853*u^29 + 7991*u^30 - 9631*u^31 - 2564*u^32 + 3683*u^33 + 294*u^34 - 1073*u^35 + 170*u^36 + 201*u^37 - 107*u^38 - 7*u^39 + 24*u^40 - 4*u^41 - 3*u^42 + u^43",
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1 + 2*u + 2*u^2 + 6*u^3 - 48*u^4 + 58*u^5 - 102*u^6 + 332*u^7 - 1036*u^8 + 2293*u^9 - 2813*u^10 + 2305*u^11 - 3206*u^12 + 1708*u^13 - 6066*u^14 + 1226*u^15 - 2177*u^16 - 1354*u^17 - 1434*u^18 + 634*u^19 - 60*u^20 - 696*u^21 + 1086*u^22 + 730*u^23 + 1603*u^24 - 283*u^25 + 407*u^26 + 487*u^27 + 455*u^28 - 200*u^29 - 311*u^30 + 363*u^31 - 187*u^32 - 101*u^33 - 113*u^34 + 80*u^35 - 50*u^36 - 6*u^37 + 14*u^39 - 2*u^40 + u^41 + u^42 + u^43",
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43",
							"-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1 + 18*u - 128*u^2 + 453*u^3 - 888*u^4 + 1301*u^5 - 2641*u^6 + 5475*u^7 - 7248*u^8 + 7757*u^9 - 13407*u^10 + 23685*u^11 - 23968*u^12 + 11136*u^13 - 10902*u^14 + 39070*u^15 - 66121*u^16 + 57308*u^17 - 24976*u^18 + 6615*u^19 - 10296*u^20 + 17073*u^21 - 17753*u^22 + 15085*u^23 - 10045*u^24 + 1869*u^25 + 3291*u^26 - 1314*u^27 - 3877*u^28 + 6607*u^29 - 5898*u^30 + 4013*u^31 - 2451*u^32 + 1751*u^33 - 1571*u^34 + 1359*u^35 - 876*u^36 + 405*u^37 - 161*u^38 + 87*u^39 - 54*u^40 + 25*u^41 - 7*u^42 + u^43",
							"-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43"
						],
						"uPolys":[
							"419 - 1000*u - 1869*u^2 + 7315*u^3 + 486*u^4 - 24151*u^5 + 16003*u^6 + 48821*u^7 - 60200*u^8 - 67786*u^9 + 132027*u^10 + 63487*u^11 - 214160*u^12 - 24292*u^13 + 277370*u^14 - 45310*u^15 - 294429*u^16 + 120352*u^17 + 257837*u^18 - 167067*u^19 - 187210*u^20 + 167009*u^21 + 115171*u^22 - 130179*u^23 - 63529*u^24 + 82800*u^25 + 33892*u^26 - 44940*u^27 - 17679*u^28 + 21853*u^29 + 7991*u^30 - 9631*u^31 - 2564*u^32 + 3683*u^33 + 294*u^34 - 1073*u^35 + 170*u^36 + 201*u^37 - 107*u^38 - 7*u^39 + 24*u^40 - 4*u^41 - 3*u^42 + u^43",
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1 + 2*u + 2*u^2 + 6*u^3 - 48*u^4 + 58*u^5 - 102*u^6 + 332*u^7 - 1036*u^8 + 2293*u^9 - 2813*u^10 + 2305*u^11 - 3206*u^12 + 1708*u^13 - 6066*u^14 + 1226*u^15 - 2177*u^16 - 1354*u^17 - 1434*u^18 + 634*u^19 - 60*u^20 - 696*u^21 + 1086*u^22 + 730*u^23 + 1603*u^24 - 283*u^25 + 407*u^26 + 487*u^27 + 455*u^28 - 200*u^29 - 311*u^30 + 363*u^31 - 187*u^32 - 101*u^33 - 113*u^34 + 80*u^35 - 50*u^36 - 6*u^37 + 14*u^39 - 2*u^40 + u^41 + u^42 + u^43",
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43",
							"-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1 + 18*u - 128*u^2 + 453*u^3 - 888*u^4 + 1301*u^5 - 2641*u^6 + 5475*u^7 - 7248*u^8 + 7757*u^9 - 13407*u^10 + 23685*u^11 - 23968*u^12 + 11136*u^13 - 10902*u^14 + 39070*u^15 - 66121*u^16 + 57308*u^17 - 24976*u^18 + 6615*u^19 - 10296*u^20 + 17073*u^21 - 17753*u^22 + 15085*u^23 - 10045*u^24 + 1869*u^25 + 3291*u^26 - 1314*u^27 - 3877*u^28 + 6607*u^29 - 5898*u^30 + 4013*u^31 - 2451*u^32 + 1751*u^33 - 1571*u^34 + 1359*u^35 - 876*u^36 + 405*u^37 - 161*u^38 + 87*u^39 - 54*u^40 + 25*u^41 - 7*u^42 + u^43",
							"-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43"
						],
						"aCuspShape":"-2 + (2089030570423829273803275030337836687270 - 89204315881602205231396483040442741048253*u + 35790311831345625901997449808317341451330*u^2 + 499813766107444995719401875847707036232143*u^3 + 104369302480519835132080517019002753500258*u^4 + 1057452765679230062930988035707645608577250*u^5 - 807648799591551374067755520281985353099326*u^6 - 10238916990986563380440592353639090743024878*u^7 + 3722317407618051623304950342110627331554743*u^8 + 27045638571089957762017059545084450775029482*u^9 - 9321778876159296949547077504576502251911397*u^10 - 32138311287031929235279700603704584779289130*u^11 + 12775936298770941614486999508615970167062760*u^12 + 1214384381885557626214395687976904367125220*u^13 - 5373590140022961413072501547133378799505390*u^14 + 56197051408670242929993009647427974246725806*u^15 - 13367061621825038765892870516281056371484312*u^16 - 90143321238530242032231328958354455062700759*u^17 + 31380668327777686783516217779356313836798438*u^18 + 64144254453712191827686052298869460525891349*u^19 - 37134427664398317975759144436990346916711628*u^20 - 198192673256626829834922292877212175248874*u^21 + 33335427554463737735870513061343275966971014*u^22 - 47740222804402602769003684041743090448902768*u^23 - 30176633465546641302592707026366483039046443*u^24 + 52861582764088650171047514281724231151713965*u^25 + 31049868536437723852853245914538111479360629*u^26 - 30749354180611253622802078289121677055109589*u^27 - 30787508048136515648356650168035283278548566*u^28 + 8693392999752787803809396122313033576340323*u^29 + 25174472497541945668772286398876660612188252*u^30 + 1410480028897493565289436742881699609323078*u^31 - 16022707950470636680246575611894390148432934*u^32 - 2699423107213196776690069138092159670895982*u^33 + 7780820183795579024863844512166422933709136*u^34 + 1382046886028203004317112631570082005401435*u^35 - 2821073835505193769967120961643834994590922*u^36 - 407910410087902593196008931696852043493334*u^37 + 732045004536734402610611978626910927572284*u^38 + 71424282633632821432946681528349137238468*u^39 - 123760116165909034040577375632703727289185*u^40 - 6006206592380817687123379512268028156350*u^41 + 10604195081170208269747763315366376412949*u^42)\/2978695090046123518019671652409296415553",
						"RepresentationsN":[
							[
								"u->0.179428 + 0.966528 I",
								"a->-0.758038 + 0.845663 I",
								"b->0.655485 - 0.701109 I"
							],
							[
								"u->0.179428 - 0.966528 I",
								"a->-0.758038 - 0.845663 I",
								"b->0.655485 + 0.701109 I"
							],
							[
								"u->0.873967 + 0.43941 I",
								"a->-1.8652 - 0.23703 I",
								"b->-0.248002 - 0.538074 I"
							],
							[
								"u->0.873967 - 0.43941 I",
								"a->-1.8652 + 0.23703 I",
								"b->-0.248002 + 0.538074 I"
							],
							[
								"u->-0.894503 + 0.382311 I",
								"a->1.17659 + 0.347821 I",
								"b->1.61995 - 0.69095 I"
							],
							[
								"u->-0.894503 - 0.382311 I",
								"a->1.17659 - 0.347821 I",
								"b->1.61995 + 0.69095 I"
							],
							[
								"u->-0.937588 + 0.179486 I",
								"a->-0.339877 - 1.37013 I",
								"b->-0.908003 + 0.652924 I"
							],
							[
								"u->-0.937588 - 0.179486 I",
								"a->-0.339877 + 1.37013 I",
								"b->-0.908003 - 0.652924 I"
							],
							[
								"u->1.00598 + 0.308159 I",
								"a->-0.113439 + 0.394153 I",
								"b->0.524877 - 0.944675 I"
							],
							[
								"u->1.00598 - 0.308159 I",
								"a->-0.113439 - 0.394153 I",
								"b->0.524877 + 0.944675 I"
							],
							[
								"u->0.765516 + 0.410276 I",
								"a->-0.11829 - 1.69787 I",
								"b->-0.114903 + 1.38843 I"
							],
							[
								"u->0.765516 - 0.410276 I",
								"a->-0.11829 + 1.69787 I",
								"b->-0.114903 - 1.38843 I"
							],
							[
								"u->-0.028174 + 0.866113 I",
								"a->0.809304 + 0.674158 I",
								"b->-0.391438 - 1.14166 I"
							],
							[
								"u->-0.028174 - 0.866113 I",
								"a->0.809304 - 0.674158 I",
								"b->-0.391438 + 1.14166 I"
							],
							[
								"u->-0.780496 + 0.342696 I",
								"a->-0.346122 - 0.358729 I",
								"b->1.14579 + 1.89719 I"
							],
							[
								"u->-0.780496 - 0.342696 I",
								"a->-0.346122 + 0.358729 I",
								"b->1.14579 - 1.89719 I"
							],
							[
								"u->-1.07872 + 0.416332 I",
								"a->0.42969 + 1.533 I",
								"b->0.516989 - 0.937834 I"
							],
							[
								"u->-1.07872 - 0.416332 I",
								"a->0.42969 - 1.533 I",
								"b->0.516989 + 0.937834 I"
							],
							[
								"u->1.129 + 0.367417 I",
								"a->-0.365298 + 0.935642 I",
								"b->-1.15401 - 0.92294 I"
							],
							[
								"u->1.129 - 0.367417 I",
								"a->-0.365298 - 0.935642 I",
								"b->-1.15401 + 0.92294 I"
							],
							[
								"u->-1.19113 + 0.116555 I",
								"a->0.256373 + 0.200746 I",
								"b->0.664648 - 0.10718 I"
							],
							[
								"u->-1.19113 - 0.116555 I",
								"a->0.256373 - 0.200746 I",
								"b->0.664648 + 0.10718 I"
							],
							[
								"u->-0.378773 + 1.2112 I",
								"a->-0.790261 - 0.487133 I",
								"b->0.729066 + 0.956751 I"
							],
							[
								"u->-0.378773 - 1.2112 I",
								"a->-0.790261 + 0.487133 I",
								"b->0.729066 - 0.956751 I"
							],
							[
								"u->-1.21392 + 0.49382 I",
								"a->-0.400742 - 0.782997 I",
								"b->-1.3662 + 1.30872 I"
							],
							[
								"u->-1.21392 - 0.49382 I",
								"a->-0.400742 + 0.782997 I",
								"b->-1.3662 - 1.30872 I"
							],
							[
								"u->-1.13727 + 0.67968 I",
								"a->0.184669 - 0.702586 I",
								"b->-0.70863 + 0.391631 I"
							],
							[
								"u->-1.13727 - 0.67968 I",
								"a->0.184669 + 0.702586 I",
								"b->-0.70863 - 0.391631 I"
							],
							[
								"u->1.15815 + 0.671841 I",
								"a->0.232978 - 0.277892 I",
								"b->0.750511 + 0.201961 I"
							],
							[
								"u->1.15815 - 0.671841 I",
								"a->0.232978 + 0.277892 I",
								"b->0.750511 - 0.201961 I"
							],
							[
								"u->1.21904 + 0.55746 I",
								"a->0.372924 - 1.20339 I",
								"b->0.973714 + 1.00282 I"
							],
							[
								"u->1.21904 - 0.55746 I",
								"a->0.372924 + 1.20339 I",
								"b->0.973714 - 1.00282 I"
							],
							[
								"u->-1.26281 + 0.69376 I",
								"a->0.265003 + 1.10087 I",
								"b->1.25438 - 1.17806 I"
							],
							[
								"u->-1.26281 - 0.69376 I",
								"a->0.265003 - 1.10087 I",
								"b->1.25438 + 1.17806 I"
							],
							[
								"u->0.548716",
								"a->2.07278",
								"b->1.17742"
							],
							[
								"u->1.41987 + 0.31511 I",
								"a->0.211755 + 0.472935 I",
								"b->0.172064 + 0.048798 I"
							],
							[
								"u->1.41987 - 0.31511 I",
								"a->0.211755 - 0.472935 I",
								"b->0.172064 - 0.048798 I"
							],
							[
								"u->1.14071 + 0.96754 I",
								"a->0.310323 + 0.683171 I",
								"b->-1.15264 - 0.275297 I"
							],
							[
								"u->1.14071 - 0.96754 I",
								"a->0.310323 - 0.683171 I",
								"b->-1.15264 + 0.275297 I"
							],
							[
								"u->-0.018931 + 0.428931 I",
								"a->1.30275 - 0.64031 I",
								"b->-0.458147 + 0.443775 I"
							],
							[
								"u->-0.018931 - 0.428931 I",
								"a->1.30275 + 0.64031 I",
								"b->-0.458147 - 0.443775 I"
							],
							[
								"u->-0.243711 + 0.078761 I",
								"a->-5.49149 - 1.45816 I",
								"b->0.405795 + 0.070225 I"
							],
							[
								"u->-0.243711 - 0.078761 I",
								"a->-5.49149 + 1.45816 I",
								"b->0.405795 - 0.070225 I"
							]
						],
						"Epsilon":0.511357,
						"uPolys_ij":[
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43",
							"1 + 29*u + 310*u^2 + 55*u^3 - 13036*u^4 - 66665*u^5 - 54508*u^6 + 790751*u^7 + 4355940*u^8 + 12084128*u^9 + 19874496*u^10 + 13858879*u^11 - 21931058*u^12 - 82570640*u^13 - 125248818*u^14 - 91467388*u^15 + 33175929*u^16 + 179849523*u^17 + 237149372*u^18 + 149635385*u^19 - 23428910*u^20 - 155423549*u^21 - 160325290*u^22 - 54854361*u^23 + 74712671*u^24 + 152163817*u^25 + 158947110*u^26 + 122975250*u^27 + 80277845*u^28 + 49720976*u^29 + 32288533*u^30 + 22094456*u^31 + 14714078*u^32 + 8849383*u^33 + 4622913*u^34 + 2063159*u^35 + 779736*u^36 + 247387*u^37 + 65052*u^38 + 13891*u^39 + 2330*u^40 + 290*u^41 + 24*u^42 + u^43",
							"-37 - 237*u - 345*u^2 + 527*u^3 + 2385*u^4 + 5213*u^5 - 849*u^6 + 34824*u^7 - 40489*u^8 + 151629*u^9 + 5392*u^10 + 124837*u^11 + 11592*u^12 + 729150*u^13 - 883118*u^14 + 1388446*u^15 - 1555737*u^16 + 3480437*u^17 - 3089523*u^18 + 7548849*u^19 - 7012283*u^20 + 11540849*u^21 - 9486395*u^22 + 13310654*u^23 - 6553596*u^24 + 11078978*u^25 - 2484803*u^26 + 6442012*u^27 - 517730*u^28 + 2660466*u^29 - 46173*u^30 + 794047*u^31 - 297*u^32 + 172877*u^33 - 1654*u^34 + 27449*u^35 - 1025*u^36 + 3113*u^37 - 217*u^38 + 254*u^39 - 23*u^40 + 17*u^41 + u^43",
							"-64 - 96*u - 2303*u^2 - 3917*u^3 - 34560*u^4 - 70627*u^5 - 310809*u^6 - 161566*u^7 - 1427804*u^8 + 907114*u^9 - 4117313*u^10 + 7286823*u^11 - 14422604*u^12 + 40330784*u^13 - 64878058*u^14 + 123242830*u^15 - 158428642*u^16 + 204793342*u^17 - 242558521*u^18 + 245165673*u^19 - 281460588*u^20 + 226402931*u^21 - 197256371*u^22 + 115219436*u^23 - 32386794*u^24 + 11136402*u^25 + 22130144*u^26 + 10753220*u^27 - 12085704*u^28 + 16531497*u^29 - 5199038*u^30 - 1382353*u^31 + 3476111*u^32 - 759181*u^33 - 466694*u^34 + 383029*u^35 - 7572*u^36 - 41279*u^37 + 3175*u^38 + 2082*u^39 - 182*u^40 - 56*u^41 + 5*u^42 + u^43",
							"1 + 22*u + 218*u^2 + 1689*u^3 + 7346*u^4 + 22777*u^5 + 38501*u^6 + 68645*u^7 + 8792*u^8 + 207377*u^9 - 62031*u^10 + 65311*u^11 - 769950*u^12 + 2212006*u^13 + 2003516*u^14 - 1054892*u^15 - 224657*u^16 - 2122842*u^17 + 1028656*u^18 + 3253183*u^19 + 2324496*u^20 + 2929663*u^21 + 384159*u^22 - 531835*u^23 + 829665*u^24 + 739999*u^25 + 727923*u^26 + 1026144*u^27 + 298013*u^28 + 121025*u^29 + 154194*u^30 + 13867*u^31 + 101881*u^32 + 73505*u^33 + 38973*u^34 + 33165*u^35 + 8342*u^36 + 6549*u^37 + 971*u^38 + 705*u^39 + 54*u^40 + 41*u^41 + u^42 + u^43",
							"-16 - 120*u - 233*u^2 - 82*u^3 - 2552*u^4 + 9375*u^5 - 14092*u^6 + 598*u^7 + 66329*u^8 - 244575*u^9 + 97897*u^10 + 1242649*u^11 - 1738736*u^12 - 2435056*u^13 + 5962288*u^14 + 1522462*u^15 - 10738214*u^16 + 2517508*u^17 + 12309573*u^18 - 7454436*u^19 - 10016852*u^20 + 10082921*u^21 + 6437996*u^22 - 9249508*u^23 - 3712003*u^24 + 6265655*u^25 + 2090922*u^26 - 3199965*u^27 - 1103512*u^28 + 1226853*u^29 + 490395*u^30 - 346248*u^31 - 169462*u^32 + 69321*u^33 + 43638*u^34 - 9130*u^35 - 8194*u^36 + 611*u^37 + 1102*u^38 + 26*u^39 - 101*u^40 - 11*u^41 + 5*u^42 + u^43",
							"-5593751 - 15951332*u - 79598214*u^2 - 113758236*u^3 + 44951360*u^4 - 561785330*u^5 - 495656265*u^6 + 1382271214*u^7 - 617055571*u^8 - 1451210588*u^9 + 1667536216*u^10 + 1096083519*u^11 - 3565008974*u^12 + 555156776*u^13 + 3317615466*u^14 - 1015976352*u^15 - 2314274969*u^16 + 546747362*u^17 + 1280520168*u^18 - 128315374*u^19 - 443989064*u^20 - 54651572*u^21 - 19730241*u^22 + 152856898*u^23 - 13752120*u^24 + 29241748*u^25 - 39002414*u^26 + 1897989*u^27 - 7696727*u^28 + 4697458*u^29 - 50330*u^30 + 1113103*u^31 - 181972*u^32 + 38714*u^33 - 79237*u^34 - 2930*u^35 - 7446*u^36 + 1420*u^37 - 47*u^38 + 300*u^39 + 41*u^40 + 26*u^41 + 2*u^42 + u^43",
							"419 - 1000*u - 1869*u^2 + 7315*u^3 + 486*u^4 - 24151*u^5 + 16003*u^6 + 48821*u^7 - 60200*u^8 - 67786*u^9 + 132027*u^10 + 63487*u^11 - 214160*u^12 - 24292*u^13 + 277370*u^14 - 45310*u^15 - 294429*u^16 + 120352*u^17 + 257837*u^18 - 167067*u^19 - 187210*u^20 + 167009*u^21 + 115171*u^22 - 130179*u^23 - 63529*u^24 + 82800*u^25 + 33892*u^26 - 44940*u^27 - 17679*u^28 + 21853*u^29 + 7991*u^30 - 9631*u^31 - 2564*u^32 + 3683*u^33 + 294*u^34 - 1073*u^35 + 170*u^36 + 201*u^37 - 107*u^38 - 7*u^39 + 24*u^40 - 4*u^41 - 3*u^42 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1601 + 13699*u - 159825*u^2 - 149994*u^3 - 178455*u^4 + 4494957*u^5 + 9246445*u^6 - 68654942*u^7 + 10418747*u^8 + 453534675*u^9 - 903590831*u^10 + 150976013*u^11 + 1534771258*u^12 - 1621550074*u^13 - 689603138*u^14 + 2138318230*u^15 - 450430017*u^16 - 1644308545*u^17 + 1034393173*u^18 + 825431016*u^19 - 1021309963*u^20 - 144208053*u^21 + 621565721*u^22 - 122463366*u^23 - 246201900*u^24 + 111098038*u^25 + 66915724*u^26 - 48943603*u^27 - 13564976*u^28 + 14948102*u^29 + 2449901*u^30 - 3505614*u^31 - 500183*u^32 + 645304*u^33 + 111460*u^34 - 90124*u^35 - 21123*u^36 + 8681*u^37 + 2855*u^38 - 448*u^39 - 237*u^40 - u^41 + 9*u^42 + u^43",
							"-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43",
							"-64 + 1448*u - 21977*u^2 - 64662*u^3 - 339036*u^4 - 293728*u^5 - 1223989*u^6 + 691199*u^7 - 1585611*u^8 + 5327023*u^9 + 2045974*u^10 + 8956807*u^11 + 16122794*u^12 - 2178328*u^13 + 39124584*u^14 - 39203026*u^15 - 37689322*u^16 - 67915378*u^17 - 72507721*u^18 - 37599682*u^19 - 77906578*u^20 + 23275954*u^21 - 63297143*u^22 + 46083655*u^23 - 29036099*u^24 + 30072417*u^25 - 5269469*u^26 + 12016133*u^27 + 1445896*u^28 + 3871410*u^29 + 1204568*u^30 + 1182551*u^31 + 365246*u^32 + 318182*u^33 + 63218*u^34 + 64818*u^35 + 6508*u^36 + 9094*u^37 + 371*u^38 + 821*u^39 + 9*u^40 + 43*u^41 + u^43",
							"931 + 547*u - 11417*u^2 - 6152*u^3 + 52051*u^4 - 49314*u^5 - 144753*u^6 + 496213*u^7 + 27272*u^8 - 559954*u^9 + 1675865*u^10 - 844817*u^11 + 235984*u^12 + 2317114*u^13 - 3056256*u^14 + 12013874*u^15 + 25611855*u^16 - 13408275*u^17 + 16568217*u^18 + 30954820*u^19 - 52629085*u^20 + 37828286*u^21 - 15056293*u^22 - 20316763*u^23 + 42045269*u^24 - 44424061*u^25 + 33174832*u^26 - 19230531*u^27 + 6857032*u^28 + 195029*u^29 - 2538641*u^30 + 2652503*u^31 - 1816034*u^32 + 998276*u^33 - 448504*u^34 + 194012*u^35 - 57241*u^36 + 22148*u^37 - 4193*u^38 + 1477*u^39 - 174*u^40 + 56*u^41 - 3*u^42 + u^43",
							"5572 + 83360*u + 601527*u^2 + 2949466*u^3 + 10927814*u^4 + 30914218*u^5 + 66206491*u^6 + 105960843*u^7 + 121663593*u^8 + 87265375*u^9 + 13144990*u^10 - 52128289*u^11 - 66684448*u^12 - 27356364*u^13 + 30129500*u^14 + 59965064*u^15 + 48242110*u^16 + 6858246*u^17 - 34744515*u^18 - 49382776*u^19 - 40094034*u^20 - 13995574*u^21 + 10267905*u^22 + 25756339*u^23 + 30127815*u^24 + 26168217*u^25 + 19557015*u^26 + 12702313*u^27 + 7284500*u^28 + 4122072*u^29 + 1840340*u^30 + 1028783*u^31 + 333582*u^32 + 214170*u^33 + 43406*u^34 + 37410*u^35 + 3878*u^36 + 5166*u^37 + 211*u^38 + 517*u^39 + 5*u^40 + 33*u^41 + u^43",
							"-1 + 2*u + 2*u^2 + 6*u^3 - 48*u^4 + 58*u^5 - 102*u^6 + 332*u^7 - 1036*u^8 + 2293*u^9 - 2813*u^10 + 2305*u^11 - 3206*u^12 + 1708*u^13 - 6066*u^14 + 1226*u^15 - 2177*u^16 - 1354*u^17 - 1434*u^18 + 634*u^19 - 60*u^20 - 696*u^21 + 1086*u^22 + 730*u^23 + 1603*u^24 - 283*u^25 + 407*u^26 + 487*u^27 + 455*u^28 - 200*u^29 - 311*u^30 + 363*u^31 - 187*u^32 - 101*u^33 - 113*u^34 + 80*u^35 - 50*u^36 - 6*u^37 + 14*u^39 - 2*u^40 + u^41 + u^42 + u^43",
							"-28 - 618*u - 7061*u^2 - 53522*u^3 - 292641*u^4 - 1195402*u^5 - 3713387*u^6 - 8900170*u^7 - 16741087*u^8 - 24807490*u^9 - 27396133*u^10 - 16045843*u^11 + 15874784*u^12 + 62027022*u^13 + 91586812*u^14 + 60727816*u^15 - 36368718*u^16 - 126001628*u^17 - 110883659*u^18 + 6327188*u^19 + 103932897*u^20 + 85206256*u^21 - 5741369*u^22 - 57604282*u^23 - 34779335*u^24 + 8048272*u^25 + 20437500*u^26 + 7377079*u^27 - 4035517*u^28 - 4339574*u^29 - 618044*u^30 + 957994*u^31 + 514669*u^32 - 36671*u^33 - 116580*u^34 - 28678*u^35 + 10585*u^36 + 6722*u^37 + 331*u^38 - 602*u^39 - 147*u^40 + 12*u^41 + 9*u^42 + u^43",
							"103 - 1160*u + 2807*u^2 + 27822*u^3 + 31228*u^4 + 125547*u^5 + 525722*u^6 + 122981*u^7 + 594551*u^8 + 2177989*u^9 - 4308789*u^10 - 13895*u^11 - 1812526*u^12 - 25733854*u^13 + 9140190*u^14 - 25409450*u^15 - 22188795*u^16 + 53138332*u^17 - 42381867*u^18 + 101871698*u^19 + 46715400*u^20 + 78159501*u^21 + 126055992*u^22 + 73220861*u^23 + 104779196*u^24 + 74240411*u^25 + 51079116*u^26 + 53976889*u^27 + 15410621*u^28 + 27301861*u^29 + 2723186*u^30 + 9231738*u^31 + 195761*u^32 + 2066319*u^33 - 24020*u^34 + 306664*u^35 - 7560*u^36 + 29887*u^37 - 830*u^38 + 1841*u^39 - 45*u^40 + 65*u^41 - u^42 + u^43",
							"1 + 68*u + 1852*u^2 + 19435*u^3 + 103330*u^4 + 359485*u^5 + 1201005*u^6 + 3766465*u^7 + 10776344*u^8 + 28672451*u^9 + 65409867*u^10 + 120289739*u^11 + 185664726*u^12 + 248328598*u^13 + 302845024*u^14 + 329549570*u^15 + 331440911*u^16 + 299824826*u^17 + 277018878*u^18 + 182288601*u^19 + 168893756*u^20 + 90218767*u^21 + 68613789*u^22 + 38125131*u^23 + 17225621*u^24 + 11425269*u^25 + 4047903*u^26 + 177292*u^27 + 430573*u^28 - 627437*u^29 - 912940*u^30 + 52335*u^31 - 455493*u^32 + 152055*u^33 - 63413*u^34 + 58299*u^35 + 1190*u^36 + 10013*u^37 + 601*u^38 + 885*u^39 + 10*u^40 + 43*u^41 - u^42 + u^43",
							"1 + 28*u + 260*u^2 + 3951*u^3 - 19594*u^4 + 76721*u^5 - 54407*u^6 - 521155*u^7 + 1485028*u^8 - 1356737*u^9 + 2047479*u^10 - 5369337*u^11 - 7096094*u^12 + 68359666*u^13 - 175468592*u^14 + 240732194*u^15 - 55742417*u^16 - 668460270*u^17 + 1964390254*u^18 - 3108586767*u^19 + 2703235988*u^20 + 398506987*u^21 - 6201064639*u^22 + 13488196827*u^23 - 20341782427*u^24 + 24841569273*u^25 - 25818617757*u^26 + 23350540284*u^27 - 18601227875*u^28 + 13131775251*u^29 - 8220795160*u^30 + 4544046395*u^31 - 2200410573*u^32 + 924381903*u^33 - 333316749*u^34 + 101999219*u^35 - 26158590*u^36 + 5538853*u^37 - 949947*u^38 + 128541*u^39 - 13202*u^40 + 967*u^41 - 45*u^42 + u^43",
							"-1 + 26*u - 336*u^2 + 2768*u^3 - 16684*u^4 + 79484*u^5 - 315448*u^6 + 1081810*u^7 - 3285456*u^8 + 8959785*u^9 - 22055955*u^10 + 49008283*u^11 - 98103514*u^12 + 176668746*u^13 - 286257670*u^14 + 418045358*u^15 - 551937835*u^16 + 661363302*u^17 - 722306868*u^18 + 722267918*u^19 - 664193782*u^20 + 564144110*u^21 - 444430048*u^22 + 325935634*u^23 - 223338471*u^24 + 143392655*u^25 - 86491259*u^26 + 49128773*u^27 - 26289841*u^28 + 13306526*u^29 - 6335855*u^30 + 2870935*u^31 - 1212601*u^32 + 493725*u^33 - 182747*u^34 + 67192*u^35 - 21208*u^36 + 7104*u^37 - 1814*u^38 + 562*u^39 - 104*u^40 + 31*u^41 - 3*u^42 + u^43",
							"-175561 + 2566222*u - 18530429*u^2 + 90217379*u^3 - 340940512*u^4 + 1081872889*u^5 - 3001433725*u^6 + 7400553039*u^7 - 16308073726*u^8 + 32227911446*u^9 - 57382166923*u^10 + 92630030031*u^11 - 136557936782*u^12 + 185276676994*u^13 - 233121064870*u^14 + 273935394038*u^15 - 302343185917*u^16 + 314579915476*u^17 - 308913293417*u^18 + 285912152737*u^19 - 248613215138*u^20 + 202270808215*u^21 - 153368495711*u^22 + 108044353245*u^23 - 70595731461*u^24 + 42766336274*u^25 - 24032678768*u^26 + 12533098604*u^27 - 6057953949*u^28 + 2701215119*u^29 - 1100405103*u^30 + 403207645*u^31 - 129956752*u^32 + 35723319*u^33 - 8008860*u^34 + 1363727*u^35 - 157120*u^36 + 13581*u^37 - 4709*u^38 + 2451*u^39 - 760*u^40 + 146*u^41 - 17*u^42 + u^43",
							"-1 + 8*u - 76*u^2 + 256*u^3 - 1944*u^4 + 5246*u^5 - 29772*u^6 - 69996*u^7 - 119682*u^8 - 63263*u^9 - 4163295*u^10 - 17377331*u^11 - 36550558*u^12 - 51320276*u^13 - 58097882*u^14 - 36264266*u^15 - 14109919*u^16 + 13299074*u^17 + 24195074*u^18 + 33148364*u^19 + 14575914*u^20 + 12679526*u^21 - 5595586*u^22 - 3775162*u^23 - 9065351*u^24 - 1925765*u^25 - 2895647*u^26 + 2039031*u^27 + 189781*u^28 + 1498100*u^29 + 9817*u^30 + 305481*u^31 - 174541*u^32 + 10271*u^33 - 56171*u^34 + 4896*u^35 - 6088*u^36 + 2722*u^37 - 184*u^38 + 444*u^39 + 12*u^40 + 33*u^41 + u^42 + u^43",
							"-3737 + 42640*u - 229642*u^2 + 840307*u^3 - 2385750*u^4 + 6040945*u^5 - 11423057*u^6 + 22015191*u^7 - 28812798*u^8 + 36786173*u^9 - 30562349*u^10 + 20301333*u^11 + 13499952*u^12 - 52115250*u^13 + 95061006*u^14 - 112105516*u^15 + 100827409*u^16 - 64312374*u^17 + 15945286*u^18 + 26341473*u^19 - 55319738*u^20 + 66030457*u^21 - 63999825*u^22 + 51792567*u^23 - 39871687*u^24 + 25836105*u^25 - 16472833*u^26 + 9867350*u^27 - 4611933*u^28 + 3114973*u^29 - 871334*u^30 + 800579*u^31 - 114309*u^32 + 161683*u^33 - 11411*u^34 + 25947*u^35 - 962*u^36 + 3381*u^37 - 91*u^38 + 347*u^39 - 12*u^40 + 25*u^41 - u^42 + u^43",
							"-2479 - 12427*u - 48896*u^2 - 214730*u^3 - 980718*u^4 - 1897650*u^5 - 3421319*u^6 - 166046*u^7 - 1470902*u^8 - 6966538*u^9 - 19903242*u^10 + 24251919*u^11 - 23696656*u^12 + 4131690*u^13 + 21335192*u^14 - 95353238*u^15 + 144797601*u^16 - 81046257*u^17 - 19171162*u^18 + 87439240*u^19 - 79660034*u^20 + 82102052*u^21 - 60383251*u^22 + 1361276*u^23 - 15269813*u^24 + 74226635*u^25 - 101977588*u^26 + 83264071*u^27 - 49125847*u^28 + 20263605*u^29 + 4396876*u^30 - 12542050*u^31 + 4595556*u^32 + 1587457*u^33 - 1245265*u^34 - 6412*u^35 + 143864*u^36 - 15582*u^37 - 8861*u^38 + 1518*u^39 + 288*u^40 - 62*u^41 - 4*u^42 + u^43",
							"-1 + 18*u - 128*u^2 + 453*u^3 - 888*u^4 + 1301*u^5 - 2641*u^6 + 5475*u^7 - 7248*u^8 + 7757*u^9 - 13407*u^10 + 23685*u^11 - 23968*u^12 + 11136*u^13 - 10902*u^14 + 39070*u^15 - 66121*u^16 + 57308*u^17 - 24976*u^18 + 6615*u^19 - 10296*u^20 + 17073*u^21 - 17753*u^22 + 15085*u^23 - 10045*u^24 + 1869*u^25 + 3291*u^26 - 1314*u^27 - 3877*u^28 + 6607*u^29 - 5898*u^30 + 4013*u^31 - 2451*u^32 + 1751*u^33 - 1571*u^34 + 1359*u^35 - 876*u^36 + 405*u^37 - 161*u^38 + 87*u^39 - 54*u^40 + 25*u^41 - 7*u^42 + u^43",
							"-361 + 4299*u - 17985*u^2 + 14343*u^3 + 146549*u^4 - 468029*u^5 - 1475939*u^6 + 18564798*u^7 - 84915601*u^8 + 232751759*u^9 - 380300664*u^10 + 211750615*u^11 + 635550056*u^12 - 1934339668*u^13 + 2434441906*u^14 - 662082822*u^15 - 3250052787*u^16 + 6692849969*u^17 - 6345289941*u^18 + 1394347661*u^19 + 5125555965*u^20 - 8645682389*u^21 + 6935497995*u^22 - 1743583116*u^23 - 3136954086*u^24 + 5094896654*u^25 - 4170543553*u^26 + 2073143706*u^27 - 384288640*u^28 - 354068780*u^29 + 407670987*u^30 - 225453737*u^31 + 71289773*u^32 - 3041361*u^33 - 11311476*u^34 + 7902003*u^35 - 3329535*u^36 + 1023811*u^37 - 240347*u^38 + 43214*u^39 - 5819*u^40 + 557*u^41 - 34*u^42 + u^43",
							"877 + 12465*u + 84979*u^2 + 398510*u^3 + 1536547*u^4 + 5209959*u^5 + 15587563*u^6 + 40987696*u^7 + 95500057*u^8 + 199836533*u^9 + 374923863*u^10 + 608620183*u^11 + 797075386*u^12 + 752110368*u^13 + 375132446*u^14 - 134423560*u^15 - 344461575*u^16 + 29953509*u^17 + 785081171*u^18 + 1291415912*u^19 + 1019821233*u^20 + 121390225*u^21 - 640246413*u^22 - 690008420*u^23 - 221360232*u^24 + 170696632*u^25 + 206621718*u^26 + 58328317*u^27 - 36919010*u^28 - 34394626*u^29 - 5196373*u^30 + 5816130*u^31 + 3059627*u^32 - 72922*u^33 - 497102*u^34 - 117432*u^35 + 31561*u^36 + 18655*u^37 + 861*u^38 - 1200*u^39 - 245*u^40 + 19*u^41 + 11*u^42 + u^43",
							"-10339 + 54319*u - 163886*u^2 + 585955*u^3 - 1733170*u^4 + 2959927*u^5 - 2479798*u^6 - 1306151*u^7 + 17191880*u^8 - 71212552*u^9 + 165447530*u^10 - 159396397*u^11 - 267278244*u^12 + 1382698798*u^13 - 3099183964*u^14 + 4892189782*u^15 - 6002166139*u^16 + 5999522171*u^17 - 5198751834*u^18 + 4297718465*u^19 - 3801340852*u^20 + 3743895195*u^21 - 3743337316*u^22 + 3430366425*u^23 - 2773751153*u^24 + 1976984625*u^25 - 1249402420*u^26 + 701852912*u^27 - 348969851*u^28 + 151358740*u^29 - 55644925*u^30 + 16854548*u^31 - 4505282*u^32 + 1449159*u^33 - 569273*u^34 + 162971*u^35 - 22670*u^36 + 3213*u^37 - 2364*u^38 + 701*u^39 - 42*u^40 - 2*u^41 - 4*u^42 + u^43",
							"-410857 + 832518*u - 12654545*u^2 + 42545842*u^3 - 65293711*u^4 + 130877531*u^5 - 445985158*u^6 + 827895556*u^7 - 205734667*u^8 - 1938403032*u^9 + 3558313784*u^10 - 2144331775*u^11 - 1341779046*u^12 + 3572484862*u^13 - 3253800894*u^14 + 1689205522*u^15 - 135176977*u^16 - 1081363072*u^17 + 1392832437*u^18 - 633447922*u^19 - 266784407*u^20 + 667161447*u^21 - 693473316*u^22 + 505441754*u^23 - 281938430*u^24 + 147935100*u^25 - 91577801*u^26 + 68586245*u^27 - 53796616*u^28 + 39664741*u^29 - 25828296*u^30 + 14811103*u^31 - 7639174*u^32 + 3486586*u^33 - 1395268*u^34 + 496074*u^35 - 156771*u^36 + 44255*u^37 - 11568*u^38 + 2928*u^39 - 683*u^40 + 128*u^41 - 16*u^42 + u^43",
							"-853 + 7493*u - 64750*u^2 + 169560*u^3 - 698924*u^4 + 2080414*u^5 - 2236919*u^6 + 6622968*u^7 - 4187710*u^8 - 10595568*u^9 - 26681578*u^10 - 37751855*u^11 + 31468316*u^12 + 142680548*u^13 + 215161940*u^14 + 99166538*u^15 - 172364091*u^16 - 347056821*u^17 - 379617822*u^18 - 312705428*u^19 - 189590602*u^20 - 33512106*u^21 + 128146687*u^22 + 256908238*u^23 + 302923979*u^24 + 282543721*u^25 + 221969200*u^26 + 148403115*u^27 + 87061359*u^28 + 45681131*u^29 + 19833448*u^30 + 9328504*u^31 + 2628056*u^32 + 1413229*u^33 + 185457*u^34 + 171956*u^35 + 3890*u^36 + 16618*u^37 - 319*u^38 + 1156*u^39 - 18*u^40 + 50*u^41 + u^43"
						],
						"GeometricComponent":"{33, 34}",
						"uPolys_ij_N":[
							"-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43",
							"1 + 29*u + 310*u^2 + 55*u^3 - 13036*u^4 - 66665*u^5 - 54508*u^6 + 790751*u^7 + 4355940*u^8 + 12084128*u^9 + 19874496*u^10 + 13858879*u^11 - 21931058*u^12 - 82570640*u^13 - 125248818*u^14 - 91467388*u^15 + 33175929*u^16 + 179849523*u^17 + 237149372*u^18 + 149635385*u^19 - 23428910*u^20 - 155423549*u^21 - 160325290*u^22 - 54854361*u^23 + 74712671*u^24 + 152163817*u^25 + 158947110*u^26 + 122975250*u^27 + 80277845*u^28 + 49720976*u^29 + 32288533*u^30 + 22094456*u^31 + 14714078*u^32 + 8849383*u^33 + 4622913*u^34 + 2063159*u^35 + 779736*u^36 + 247387*u^37 + 65052*u^38 + 13891*u^39 + 2330*u^40 + 290*u^41 + 24*u^42 + u^43",
							"-37 - 237*u - 345*u^2 + 527*u^3 + 2385*u^4 + 5213*u^5 - 849*u^6 + 34824*u^7 - 40489*u^8 + 151629*u^9 + 5392*u^10 + 124837*u^11 + 11592*u^12 + 729150*u^13 - 883118*u^14 + 1388446*u^15 - 1555737*u^16 + 3480437*u^17 - 3089523*u^18 + 7548849*u^19 - 7012283*u^20 + 11540849*u^21 - 9486395*u^22 + 13310654*u^23 - 6553596*u^24 + 11078978*u^25 - 2484803*u^26 + 6442012*u^27 - 517730*u^28 + 2660466*u^29 - 46173*u^30 + 794047*u^31 - 297*u^32 + 172877*u^33 - 1654*u^34 + 27449*u^35 - 1025*u^36 + 3113*u^37 - 217*u^38 + 254*u^39 - 23*u^40 + 17*u^41 + u^43",
							"-64 - 96*u - 2303*u^2 - 3917*u^3 - 34560*u^4 - 70627*u^5 - 310809*u^6 - 161566*u^7 - 1427804*u^8 + 907114*u^9 - 4117313*u^10 + 7286823*u^11 - 14422604*u^12 + 40330784*u^13 - 64878058*u^14 + 123242830*u^15 - 158428642*u^16 + 204793342*u^17 - 242558521*u^18 + 245165673*u^19 - 281460588*u^20 + 226402931*u^21 - 197256371*u^22 + 115219436*u^23 - 32386794*u^24 + 11136402*u^25 + 22130144*u^26 + 10753220*u^27 - 12085704*u^28 + 16531497*u^29 - 5199038*u^30 - 1382353*u^31 + 3476111*u^32 - 759181*u^33 - 466694*u^34 + 383029*u^35 - 7572*u^36 - 41279*u^37 + 3175*u^38 + 2082*u^39 - 182*u^40 - 56*u^41 + 5*u^42 + u^43",
							"1 + 22*u + 218*u^2 + 1689*u^3 + 7346*u^4 + 22777*u^5 + 38501*u^6 + 68645*u^7 + 8792*u^8 + 207377*u^9 - 62031*u^10 + 65311*u^11 - 769950*u^12 + 2212006*u^13 + 2003516*u^14 - 1054892*u^15 - 224657*u^16 - 2122842*u^17 + 1028656*u^18 + 3253183*u^19 + 2324496*u^20 + 2929663*u^21 + 384159*u^22 - 531835*u^23 + 829665*u^24 + 739999*u^25 + 727923*u^26 + 1026144*u^27 + 298013*u^28 + 121025*u^29 + 154194*u^30 + 13867*u^31 + 101881*u^32 + 73505*u^33 + 38973*u^34 + 33165*u^35 + 8342*u^36 + 6549*u^37 + 971*u^38 + 705*u^39 + 54*u^40 + 41*u^41 + u^42 + u^43",
							"-16 - 120*u - 233*u^2 - 82*u^3 - 2552*u^4 + 9375*u^5 - 14092*u^6 + 598*u^7 + 66329*u^8 - 244575*u^9 + 97897*u^10 + 1242649*u^11 - 1738736*u^12 - 2435056*u^13 + 5962288*u^14 + 1522462*u^15 - 10738214*u^16 + 2517508*u^17 + 12309573*u^18 - 7454436*u^19 - 10016852*u^20 + 10082921*u^21 + 6437996*u^22 - 9249508*u^23 - 3712003*u^24 + 6265655*u^25 + 2090922*u^26 - 3199965*u^27 - 1103512*u^28 + 1226853*u^29 + 490395*u^30 - 346248*u^31 - 169462*u^32 + 69321*u^33 + 43638*u^34 - 9130*u^35 - 8194*u^36 + 611*u^37 + 1102*u^38 + 26*u^39 - 101*u^40 - 11*u^41 + 5*u^42 + u^43",
							"-5593751 - 15951332*u - 79598214*u^2 - 113758236*u^3 + 44951360*u^4 - 561785330*u^5 - 495656265*u^6 + 1382271214*u^7 - 617055571*u^8 - 1451210588*u^9 + 1667536216*u^10 + 1096083519*u^11 - 3565008974*u^12 + 555156776*u^13 + 3317615466*u^14 - 1015976352*u^15 - 2314274969*u^16 + 546747362*u^17 + 1280520168*u^18 - 128315374*u^19 - 443989064*u^20 - 54651572*u^21 - 19730241*u^22 + 152856898*u^23 - 13752120*u^24 + 29241748*u^25 - 39002414*u^26 + 1897989*u^27 - 7696727*u^28 + 4697458*u^29 - 50330*u^30 + 1113103*u^31 - 181972*u^32 + 38714*u^33 - 79237*u^34 - 2930*u^35 - 7446*u^36 + 1420*u^37 - 47*u^38 + 300*u^39 + 41*u^40 + 26*u^41 + 2*u^42 + u^43",
							"419 - 1000*u - 1869*u^2 + 7315*u^3 + 486*u^4 - 24151*u^5 + 16003*u^6 + 48821*u^7 - 60200*u^8 - 67786*u^9 + 132027*u^10 + 63487*u^11 - 214160*u^12 - 24292*u^13 + 277370*u^14 - 45310*u^15 - 294429*u^16 + 120352*u^17 + 257837*u^18 - 167067*u^19 - 187210*u^20 + 167009*u^21 + 115171*u^22 - 130179*u^23 - 63529*u^24 + 82800*u^25 + 33892*u^26 - 44940*u^27 - 17679*u^28 + 21853*u^29 + 7991*u^30 - 9631*u^31 - 2564*u^32 + 3683*u^33 + 294*u^34 - 1073*u^35 + 170*u^36 + 201*u^37 - 107*u^38 - 7*u^39 + 24*u^40 - 4*u^41 - 3*u^42 + u^43",
							"-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43",
							"-1601 + 13699*u - 159825*u^2 - 149994*u^3 - 178455*u^4 + 4494957*u^5 + 9246445*u^6 - 68654942*u^7 + 10418747*u^8 + 453534675*u^9 - 903590831*u^10 + 150976013*u^11 + 1534771258*u^12 - 1621550074*u^13 - 689603138*u^14 + 2138318230*u^15 - 450430017*u^16 - 1644308545*u^17 + 1034393173*u^18 + 825431016*u^19 - 1021309963*u^20 - 144208053*u^21 + 621565721*u^22 - 122463366*u^23 - 246201900*u^24 + 111098038*u^25 + 66915724*u^26 - 48943603*u^27 - 13564976*u^28 + 14948102*u^29 + 2449901*u^30 - 3505614*u^31 - 500183*u^32 + 645304*u^33 + 111460*u^34 - 90124*u^35 - 21123*u^36 + 8681*u^37 + 2855*u^38 - 448*u^39 - 237*u^40 - u^41 + 9*u^42 + u^43",
							"-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43",
							"-64 + 1448*u - 21977*u^2 - 64662*u^3 - 339036*u^4 - 293728*u^5 - 1223989*u^6 + 691199*u^7 - 1585611*u^8 + 5327023*u^9 + 2045974*u^10 + 8956807*u^11 + 16122794*u^12 - 2178328*u^13 + 39124584*u^14 - 39203026*u^15 - 37689322*u^16 - 67915378*u^17 - 72507721*u^18 - 37599682*u^19 - 77906578*u^20 + 23275954*u^21 - 63297143*u^22 + 46083655*u^23 - 29036099*u^24 + 30072417*u^25 - 5269469*u^26 + 12016133*u^27 + 1445896*u^28 + 3871410*u^29 + 1204568*u^30 + 1182551*u^31 + 365246*u^32 + 318182*u^33 + 63218*u^34 + 64818*u^35 + 6508*u^36 + 9094*u^37 + 371*u^38 + 821*u^39 + 9*u^40 + 43*u^41 + u^43",
							"931 + 547*u - 11417*u^2 - 6152*u^3 + 52051*u^4 - 49314*u^5 - 144753*u^6 + 496213*u^7 + 27272*u^8 - 559954*u^9 + 1675865*u^10 - 844817*u^11 + 235984*u^12 + 2317114*u^13 - 3056256*u^14 + 12013874*u^15 + 25611855*u^16 - 13408275*u^17 + 16568217*u^18 + 30954820*u^19 - 52629085*u^20 + 37828286*u^21 - 15056293*u^22 - 20316763*u^23 + 42045269*u^24 - 44424061*u^25 + 33174832*u^26 - 19230531*u^27 + 6857032*u^28 + 195029*u^29 - 2538641*u^30 + 2652503*u^31 - 1816034*u^32 + 998276*u^33 - 448504*u^34 + 194012*u^35 - 57241*u^36 + 22148*u^37 - 4193*u^38 + 1477*u^39 - 174*u^40 + 56*u^41 - 3*u^42 + u^43",
							"5572 + 83360*u + 601527*u^2 + 2949466*u^3 + 10927814*u^4 + 30914218*u^5 + 66206491*u^6 + 105960843*u^7 + 121663593*u^8 + 87265375*u^9 + 13144990*u^10 - 52128289*u^11 - 66684448*u^12 - 27356364*u^13 + 30129500*u^14 + 59965064*u^15 + 48242110*u^16 + 6858246*u^17 - 34744515*u^18 - 49382776*u^19 - 40094034*u^20 - 13995574*u^21 + 10267905*u^22 + 25756339*u^23 + 30127815*u^24 + 26168217*u^25 + 19557015*u^26 + 12702313*u^27 + 7284500*u^28 + 4122072*u^29 + 1840340*u^30 + 1028783*u^31 + 333582*u^32 + 214170*u^33 + 43406*u^34 + 37410*u^35 + 3878*u^36 + 5166*u^37 + 211*u^38 + 517*u^39 + 5*u^40 + 33*u^41 + u^43",
							"-1 + 2*u + 2*u^2 + 6*u^3 - 48*u^4 + 58*u^5 - 102*u^6 + 332*u^7 - 1036*u^8 + 2293*u^9 - 2813*u^10 + 2305*u^11 - 3206*u^12 + 1708*u^13 - 6066*u^14 + 1226*u^15 - 2177*u^16 - 1354*u^17 - 1434*u^18 + 634*u^19 - 60*u^20 - 696*u^21 + 1086*u^22 + 730*u^23 + 1603*u^24 - 283*u^25 + 407*u^26 + 487*u^27 + 455*u^28 - 200*u^29 - 311*u^30 + 363*u^31 - 187*u^32 - 101*u^33 - 113*u^34 + 80*u^35 - 50*u^36 - 6*u^37 + 14*u^39 - 2*u^40 + u^41 + u^42 + u^43",
							"-28 - 618*u - 7061*u^2 - 53522*u^3 - 292641*u^4 - 1195402*u^5 - 3713387*u^6 - 8900170*u^7 - 16741087*u^8 - 24807490*u^9 - 27396133*u^10 - 16045843*u^11 + 15874784*u^12 + 62027022*u^13 + 91586812*u^14 + 60727816*u^15 - 36368718*u^16 - 126001628*u^17 - 110883659*u^18 + 6327188*u^19 + 103932897*u^20 + 85206256*u^21 - 5741369*u^22 - 57604282*u^23 - 34779335*u^24 + 8048272*u^25 + 20437500*u^26 + 7377079*u^27 - 4035517*u^28 - 4339574*u^29 - 618044*u^30 + 957994*u^31 + 514669*u^32 - 36671*u^33 - 116580*u^34 - 28678*u^35 + 10585*u^36 + 6722*u^37 + 331*u^38 - 602*u^39 - 147*u^40 + 12*u^41 + 9*u^42 + u^43",
							"103 - 1160*u + 2807*u^2 + 27822*u^3 + 31228*u^4 + 125547*u^5 + 525722*u^6 + 122981*u^7 + 594551*u^8 + 2177989*u^9 - 4308789*u^10 - 13895*u^11 - 1812526*u^12 - 25733854*u^13 + 9140190*u^14 - 25409450*u^15 - 22188795*u^16 + 53138332*u^17 - 42381867*u^18 + 101871698*u^19 + 46715400*u^20 + 78159501*u^21 + 126055992*u^22 + 73220861*u^23 + 104779196*u^24 + 74240411*u^25 + 51079116*u^26 + 53976889*u^27 + 15410621*u^28 + 27301861*u^29 + 2723186*u^30 + 9231738*u^31 + 195761*u^32 + 2066319*u^33 - 24020*u^34 + 306664*u^35 - 7560*u^36 + 29887*u^37 - 830*u^38 + 1841*u^39 - 45*u^40 + 65*u^41 - u^42 + u^43",
							"1 + 68*u + 1852*u^2 + 19435*u^3 + 103330*u^4 + 359485*u^5 + 1201005*u^6 + 3766465*u^7 + 10776344*u^8 + 28672451*u^9 + 65409867*u^10 + 120289739*u^11 + 185664726*u^12 + 248328598*u^13 + 302845024*u^14 + 329549570*u^15 + 331440911*u^16 + 299824826*u^17 + 277018878*u^18 + 182288601*u^19 + 168893756*u^20 + 90218767*u^21 + 68613789*u^22 + 38125131*u^23 + 17225621*u^24 + 11425269*u^25 + 4047903*u^26 + 177292*u^27 + 430573*u^28 - 627437*u^29 - 912940*u^30 + 52335*u^31 - 455493*u^32 + 152055*u^33 - 63413*u^34 + 58299*u^35 + 1190*u^36 + 10013*u^37 + 601*u^38 + 885*u^39 + 10*u^40 + 43*u^41 - u^42 + u^43",
							"1 + 28*u + 260*u^2 + 3951*u^3 - 19594*u^4 + 76721*u^5 - 54407*u^6 - 521155*u^7 + 1485028*u^8 - 1356737*u^9 + 2047479*u^10 - 5369337*u^11 - 7096094*u^12 + 68359666*u^13 - 175468592*u^14 + 240732194*u^15 - 55742417*u^16 - 668460270*u^17 + 1964390254*u^18 - 3108586767*u^19 + 2703235988*u^20 + 398506987*u^21 - 6201064639*u^22 + 13488196827*u^23 - 20341782427*u^24 + 24841569273*u^25 - 25818617757*u^26 + 23350540284*u^27 - 18601227875*u^28 + 13131775251*u^29 - 8220795160*u^30 + 4544046395*u^31 - 2200410573*u^32 + 924381903*u^33 - 333316749*u^34 + 101999219*u^35 - 26158590*u^36 + 5538853*u^37 - 949947*u^38 + 128541*u^39 - 13202*u^40 + 967*u^41 - 45*u^42 + u^43",
							"-1 + 26*u - 336*u^2 + 2768*u^3 - 16684*u^4 + 79484*u^5 - 315448*u^6 + 1081810*u^7 - 3285456*u^8 + 8959785*u^9 - 22055955*u^10 + 49008283*u^11 - 98103514*u^12 + 176668746*u^13 - 286257670*u^14 + 418045358*u^15 - 551937835*u^16 + 661363302*u^17 - 722306868*u^18 + 722267918*u^19 - 664193782*u^20 + 564144110*u^21 - 444430048*u^22 + 325935634*u^23 - 223338471*u^24 + 143392655*u^25 - 86491259*u^26 + 49128773*u^27 - 26289841*u^28 + 13306526*u^29 - 6335855*u^30 + 2870935*u^31 - 1212601*u^32 + 493725*u^33 - 182747*u^34 + 67192*u^35 - 21208*u^36 + 7104*u^37 - 1814*u^38 + 562*u^39 - 104*u^40 + 31*u^41 - 3*u^42 + u^43",
							"-175561 + 2566222*u - 18530429*u^2 + 90217379*u^3 - 340940512*u^4 + 1081872889*u^5 - 3001433725*u^6 + 7400553039*u^7 - 16308073726*u^8 + 32227911446*u^9 - 57382166923*u^10 + 92630030031*u^11 - 136557936782*u^12 + 185276676994*u^13 - 233121064870*u^14 + 273935394038*u^15 - 302343185917*u^16 + 314579915476*u^17 - 308913293417*u^18 + 285912152737*u^19 - 248613215138*u^20 + 202270808215*u^21 - 153368495711*u^22 + 108044353245*u^23 - 70595731461*u^24 + 42766336274*u^25 - 24032678768*u^26 + 12533098604*u^27 - 6057953949*u^28 + 2701215119*u^29 - 1100405103*u^30 + 403207645*u^31 - 129956752*u^32 + 35723319*u^33 - 8008860*u^34 + 1363727*u^35 - 157120*u^36 + 13581*u^37 - 4709*u^38 + 2451*u^39 - 760*u^40 + 146*u^41 - 17*u^42 + u^43",
							"-1 + 8*u - 76*u^2 + 256*u^3 - 1944*u^4 + 5246*u^5 - 29772*u^6 - 69996*u^7 - 119682*u^8 - 63263*u^9 - 4163295*u^10 - 17377331*u^11 - 36550558*u^12 - 51320276*u^13 - 58097882*u^14 - 36264266*u^15 - 14109919*u^16 + 13299074*u^17 + 24195074*u^18 + 33148364*u^19 + 14575914*u^20 + 12679526*u^21 - 5595586*u^22 - 3775162*u^23 - 9065351*u^24 - 1925765*u^25 - 2895647*u^26 + 2039031*u^27 + 189781*u^28 + 1498100*u^29 + 9817*u^30 + 305481*u^31 - 174541*u^32 + 10271*u^33 - 56171*u^34 + 4896*u^35 - 6088*u^36 + 2722*u^37 - 184*u^38 + 444*u^39 + 12*u^40 + 33*u^41 + u^42 + u^43",
							"-3737 + 42640*u - 229642*u^2 + 840307*u^3 - 2385750*u^4 + 6040945*u^5 - 11423057*u^6 + 22015191*u^7 - 28812798*u^8 + 36786173*u^9 - 30562349*u^10 + 20301333*u^11 + 13499952*u^12 - 52115250*u^13 + 95061006*u^14 - 112105516*u^15 + 100827409*u^16 - 64312374*u^17 + 15945286*u^18 + 26341473*u^19 - 55319738*u^20 + 66030457*u^21 - 63999825*u^22 + 51792567*u^23 - 39871687*u^24 + 25836105*u^25 - 16472833*u^26 + 9867350*u^27 - 4611933*u^28 + 3114973*u^29 - 871334*u^30 + 800579*u^31 - 114309*u^32 + 161683*u^33 - 11411*u^34 + 25947*u^35 - 962*u^36 + 3381*u^37 - 91*u^38 + 347*u^39 - 12*u^40 + 25*u^41 - u^42 + u^43",
							"-2479 - 12427*u - 48896*u^2 - 214730*u^3 - 980718*u^4 - 1897650*u^5 - 3421319*u^6 - 166046*u^7 - 1470902*u^8 - 6966538*u^9 - 19903242*u^10 + 24251919*u^11 - 23696656*u^12 + 4131690*u^13 + 21335192*u^14 - 95353238*u^15 + 144797601*u^16 - 81046257*u^17 - 19171162*u^18 + 87439240*u^19 - 79660034*u^20 + 82102052*u^21 - 60383251*u^22 + 1361276*u^23 - 15269813*u^24 + 74226635*u^25 - 101977588*u^26 + 83264071*u^27 - 49125847*u^28 + 20263605*u^29 + 4396876*u^30 - 12542050*u^31 + 4595556*u^32 + 1587457*u^33 - 1245265*u^34 - 6412*u^35 + 143864*u^36 - 15582*u^37 - 8861*u^38 + 1518*u^39 + 288*u^40 - 62*u^41 - 4*u^42 + u^43",
							"-1 + 18*u - 128*u^2 + 453*u^3 - 888*u^4 + 1301*u^5 - 2641*u^6 + 5475*u^7 - 7248*u^8 + 7757*u^9 - 13407*u^10 + 23685*u^11 - 23968*u^12 + 11136*u^13 - 10902*u^14 + 39070*u^15 - 66121*u^16 + 57308*u^17 - 24976*u^18 + 6615*u^19 - 10296*u^20 + 17073*u^21 - 17753*u^22 + 15085*u^23 - 10045*u^24 + 1869*u^25 + 3291*u^26 - 1314*u^27 - 3877*u^28 + 6607*u^29 - 5898*u^30 + 4013*u^31 - 2451*u^32 + 1751*u^33 - 1571*u^34 + 1359*u^35 - 876*u^36 + 405*u^37 - 161*u^38 + 87*u^39 - 54*u^40 + 25*u^41 - 7*u^42 + u^43",
							"-361 + 4299*u - 17985*u^2 + 14343*u^3 + 146549*u^4 - 468029*u^5 - 1475939*u^6 + 18564798*u^7 - 84915601*u^8 + 232751759*u^9 - 380300664*u^10 + 211750615*u^11 + 635550056*u^12 - 1934339668*u^13 + 2434441906*u^14 - 662082822*u^15 - 3250052787*u^16 + 6692849969*u^17 - 6345289941*u^18 + 1394347661*u^19 + 5125555965*u^20 - 8645682389*u^21 + 6935497995*u^22 - 1743583116*u^23 - 3136954086*u^24 + 5094896654*u^25 - 4170543553*u^26 + 2073143706*u^27 - 384288640*u^28 - 354068780*u^29 + 407670987*u^30 - 225453737*u^31 + 71289773*u^32 - 3041361*u^33 - 11311476*u^34 + 7902003*u^35 - 3329535*u^36 + 1023811*u^37 - 240347*u^38 + 43214*u^39 - 5819*u^40 + 557*u^41 - 34*u^42 + u^43",
							"877 + 12465*u + 84979*u^2 + 398510*u^3 + 1536547*u^4 + 5209959*u^5 + 15587563*u^6 + 40987696*u^7 + 95500057*u^8 + 199836533*u^9 + 374923863*u^10 + 608620183*u^11 + 797075386*u^12 + 752110368*u^13 + 375132446*u^14 - 134423560*u^15 - 344461575*u^16 + 29953509*u^17 + 785081171*u^18 + 1291415912*u^19 + 1019821233*u^20 + 121390225*u^21 - 640246413*u^22 - 690008420*u^23 - 221360232*u^24 + 170696632*u^25 + 206621718*u^26 + 58328317*u^27 - 36919010*u^28 - 34394626*u^29 - 5196373*u^30 + 5816130*u^31 + 3059627*u^32 - 72922*u^33 - 497102*u^34 - 117432*u^35 + 31561*u^36 + 18655*u^37 + 861*u^38 - 1200*u^39 - 245*u^40 + 19*u^41 + 11*u^42 + u^43",
							"-10339 + 54319*u - 163886*u^2 + 585955*u^3 - 1733170*u^4 + 2959927*u^5 - 2479798*u^6 - 1306151*u^7 + 17191880*u^8 - 71212552*u^9 + 165447530*u^10 - 159396397*u^11 - 267278244*u^12 + 1382698798*u^13 - 3099183964*u^14 + 4892189782*u^15 - 6002166139*u^16 + 5999522171*u^17 - 5198751834*u^18 + 4297718465*u^19 - 3801340852*u^20 + 3743895195*u^21 - 3743337316*u^22 + 3430366425*u^23 - 2773751153*u^24 + 1976984625*u^25 - 1249402420*u^26 + 701852912*u^27 - 348969851*u^28 + 151358740*u^29 - 55644925*u^30 + 16854548*u^31 - 4505282*u^32 + 1449159*u^33 - 569273*u^34 + 162971*u^35 - 22670*u^36 + 3213*u^37 - 2364*u^38 + 701*u^39 - 42*u^40 - 2*u^41 - 4*u^42 + u^43",
							"-410857 + 832518*u - 12654545*u^2 + 42545842*u^3 - 65293711*u^4 + 130877531*u^5 - 445985158*u^6 + 827895556*u^7 - 205734667*u^8 - 1938403032*u^9 + 3558313784*u^10 - 2144331775*u^11 - 1341779046*u^12 + 3572484862*u^13 - 3253800894*u^14 + 1689205522*u^15 - 135176977*u^16 - 1081363072*u^17 + 1392832437*u^18 - 633447922*u^19 - 266784407*u^20 + 667161447*u^21 - 693473316*u^22 + 505441754*u^23 - 281938430*u^24 + 147935100*u^25 - 91577801*u^26 + 68586245*u^27 - 53796616*u^28 + 39664741*u^29 - 25828296*u^30 + 14811103*u^31 - 7639174*u^32 + 3486586*u^33 - 1395268*u^34 + 496074*u^35 - 156771*u^36 + 44255*u^37 - 11568*u^38 + 2928*u^39 - 683*u^40 + 128*u^41 - 16*u^42 + u^43",
							"-853 + 7493*u - 64750*u^2 + 169560*u^3 - 698924*u^4 + 2080414*u^5 - 2236919*u^6 + 6622968*u^7 - 4187710*u^8 - 10595568*u^9 - 26681578*u^10 - 37751855*u^11 + 31468316*u^12 + 142680548*u^13 + 215161940*u^14 + 99166538*u^15 - 172364091*u^16 - 347056821*u^17 - 379617822*u^18 - 312705428*u^19 - 189590602*u^20 - 33512106*u^21 + 128146687*u^22 + 256908238*u^23 + 302923979*u^24 + 282543721*u^25 + 221969200*u^26 + 148403115*u^27 + 87061359*u^28 + 45681131*u^29 + 19833448*u^30 + 9328504*u^31 + 2628056*u^32 + 1413229*u^33 + 185457*u^34 + 171956*u^35 + 3890*u^36 + 16618*u^37 - 319*u^38 + 1156*u^39 - 18*u^40 + 50*u^41 + u^43"
						],
						"Multiplicity":1,
						"ij_list":[
							[
								"{2, 6}",
								"{3, 6}",
								"{3, 7}"
							],
							[
								"{2, 3}",
								"{6, 7}"
							],
							[
								"{2, 7}"
							],
							[
								"{4, 10}"
							],
							[
								"{3, 5}"
							],
							[
								"{6, 9}"
							],
							[
								"{1, 6}"
							],
							[
								"{1, 5}",
								"{2, 5}"
							],
							[
								"{3, 9}",
								"{4, 8}",
								"{4, 9}",
								"{5, 8}"
							],
							[
								"{7, 9}"
							],
							[
								"{1, 7}",
								"{1, 8}",
								"{7, 10}"
							],
							[
								"{2, 8}"
							],
							[
								"{8, 10}"
							],
							[
								"{1, 3}"
							],
							[
								"{5, 10}",
								"{6, 10}"
							],
							[
								"{5, 7}"
							],
							[
								"{1, 4}"
							],
							[
								"{9, 10}"
							],
							[
								"{3, 4}",
								"{4, 5}",
								"{8, 9}"
							],
							[
								"{3, 10}"
							],
							[
								"{1, 2}"
							],
							[
								"{5, 6}"
							],
							[
								"{3, 8}",
								"{5, 9}"
							],
							[
								"{1, 9}"
							],
							[
								"{2, 9}",
								"{2, 10}"
							],
							[
								"{1, 10}",
								"{7, 8}"
							],
							[
								"{2, 4}"
							],
							[
								"{4, 6}"
							],
							[
								"{6, 8}"
							],
							[
								"{4, 7}"
							]
						],
						"SortedReprnIndices":"{33, 34, 32, 31, 24, 23, 25, 26, 4, 3, 20, 19, 1, 2, 39, 38, 15, 16, 17, 18, 30, 29, 27, 28, 10, 9, 37, 36, 14, 13, 40, 41, 11, 12, 7, 8, 6, 5, 21, 22, 43, 42, 35}",
						"aCuspShapeN":[
							"2.5248763503749668882`4.748669841710586 - 5.8473737543002916663`5.113390581339617*I",
							"2.5248763503749668882`4.748669841710586 + 5.8473737543002916663`5.113390581339617*I",
							"3.1492026093317105611`4.808981539382239 + 6.1552376472355329032`5.10002576201222*I",
							"3.1492026093317105611`4.808981539382239 - 6.1552376472355329032`5.10002576201222*I",
							"3.4214244199743586622`5.142885352552432 - 0.6470054795175638324`4.419586360518885*I",
							"3.4214244199743586622`5.142885352552432 + 0.6470054795175638324`4.419586360518885*I",
							"-3.8630530515606597648`5.138354848315934 + 0.9271103287102493102`4.518555595407941*I",
							"-3.8630530515606597648`5.138354848315934 - 0.9271103287102493102`4.518555595407941*I",
							"2.0050469140549260008`4.677289249833519 + 5.6141257548167424018`5.124446847623228*I",
							"2.0050469140549260008`4.677289249833519 - 5.6141257548167424018`5.124446847623228*I",
							"3.2892380005492334985`5.102303152709549 + 1.6400110126706452775`4.8000546180356505*I",
							"3.2892380005492334985`5.102303152709549 - 1.6400110126706452775`4.8000546180356505*I",
							"2.8507226365226422476`4.990397662720902 + 2.9768225069028285831`5.009195639008157*I",
							"2.8507226365226422476`4.990397662720902 - 2.9768225069028285831`5.009195639008157*I",
							"3.6550328385360591686`4.744069544198291 - 8.5715499907494367736`5.114237623343032*I",
							"3.6550328385360591686`4.744069544198291 + 8.5715499907494367736`5.114237623343032*I",
							"1.5539133084314621989`4.646343004682933 - 4.7117113795718901106`5.1280948979467755*I",
							"1.5539133084314621989`4.646343004682933 + 4.7117113795718901106`5.1280948979467755*I",
							"-5.9600458118494000552`4.977999279644947 + 6.5648623860744828818`5.019975308445753*I",
							"-5.9600458118494000552`4.977999279644947 - 6.5648623860744828818`5.019975308445753*I",
							"-6.2852856345519513328`5.146613478844761 + 0.8462884307034995074`4.275806863715295*I",
							"-6.2852856345519513328`5.146613478844761 - 0.8462884307034995074`4.275806863715295*I",
							"4.081975045170061633`4.947578791492195 + 5.0755911195178407058`5.042195074979086*I",
							"4.081975045170061633`4.947578791492195 - 5.0755911195178407058`5.042195074979086*I",
							"0``4.233454778710896 - 6.5791690996984868702`5.05162582761335*I",
							"0``4.233454778710896 + 6.5791690996984868702`5.05162582761335*I",
							"0``4.063807588241005 - 9.2054473913431312712`5.027852488617154*I",
							"0``4.063807588241005 + 9.2054473913431312712`5.027852488617154*I",
							0,
							0,
							0,
							0,
							0,
							0,
							8.6199,
							0,
							0,
							0,
							0,
							"-2.36544197978855977`4.724290452204217 - 5.8515380727668701241`5.117648187277484*I",
							"-2.36544197978855977`4.724290452204217 + 5.8515380727668701241`5.117648187277484*I",
							"4.9171774343207821696`5.148881198292207 - 0.4273222621108295603`4.087920837129487*I",
							"4.9171774343207821696`5.148881198292207 + 0.4273222621108295603`4.087920837129487*I"
						],
						"Abelian":false
					},
					{
						"IdealName":"J10_102_1",
						"Generators":[
							"-3 + b + 6*u^2 - u^3 - 3*u^4 + u^6",
							"-1 + a - u - 2*u^2 + 2*u^3 + u^4 - u^5 - u^6",
							"-1 - u + 3*u^2 + 3*u^3 - 3*u^4 - 2*u^5 + u^6 + u^7"
						],
						"VariableOrder":[
							"b",
							"a",
							"u"
						],
						"Characteristic":0,
						"KnownGroebner":[],
						"Status":[
							"vCompNormalize"
						],
						"MonomialOrder":"lex",
						"IsHomogeneous":false,
						"IsZeroDim":true,
						"IdealDimension":0,
						"Timings":{
							"TimingGroebner":8.7276e-2,
							"TimingZeroDimVars":7.1477e-2,
							"TimingmagmaVCompNormalize":7.2919e-2,
							"TimingNumberOfSols":7.8422e-2,
							"TimingIsRadical":3.552e-3,
							"TimingArcColoring":6.6974e-2,
							"TimingObstruction":7.7160000000000015e-3,
							"TimingComplexVolumeN":5.81169,
							"TimingaCuspShapeN":3.3091e-2,
							"TiminguValues":0.654689,
							"TiminguPolysN":4.8179999999999985e-3,
							"TiminguPolys":0.839314,
							"TimingaCuspShape":0.110593,
							"TimingRepresentationsN":7.6982e-2,
							"TiminguValues_ij":0.178999,
							"TiminguPoly_ij":2.302211,
							"TiminguPolys_ij_N":1.4266000000000001e-2
						},
						"ZeroDimensionalVars":[
							"b",
							"a",
							"u"
						],
						"NumberOfSols":7,
						"IsRadical":true,
						"ArcColoring":[
							[
								"2 + u + 2*u^2 - 2*u^3 - u^4 + u^5 + u^6",
								"2 - 5*u^2 + u^3 + 3*u^4 - u^6"
							],
							"{1, 0}",
							[
								1,
								"u^2"
							],
							[
								"4 - 2*u - 14*u^2 + 7*u^3 + 8*u^4 - 2*u^5 - 4*u^6",
								"u - 3*u^2 + u^3 + 2*u^4 - u^6"
							],
							[
								"-3 - 4*u + 5*u^2 + 3*u^3 - 2*u^4 - 2*u^5",
								"1 - 2*u - 3*u^2 + 3*u^3 + 2*u^4 - u^5 - u^6"
							],
							[
								0,
								"u"
							],
							[
								"-u",
								"u - u^3"
							],
							[
								"-1 + 7*u + 4*u^2 - 7*u^3 - 3*u^4 + 3*u^5 + 2*u^6",
								"-2 + 2*u + 7*u^2 - 4*u^3 - 4*u^4 + u^5 + 2*u^6"
							],
							[
								"4 + u - 4*u^2 - u^3 + 2*u^4 + u^5",
								"3 - 6*u^2 + u^3 + 3*u^4 - u^6"
							],
							[
								"1 + u + 2*u^2 - 2*u^3 - u^4 + u^5 + u^6",
								"3 - 6*u^2 + u^3 + 3*u^4 - u^6"
							]
						],
						"Obstruction":1,
						"ComplexVolumeN":[
							"-1.05108 - 2.2715*I",
							"-1.05108 + 2.2715*I",
							2.16696,
							"8.25977 + 2.86772*I",
							"8.25977 - 2.86772*I",
							"1.57743 + 3.93356*I",
							"1.57743 - 3.93356*I"
						],
						"uPolysN":[
							"1 + 2*u^3 - u^4 + u^5 + u^7",
							"-1 - u + 3*u^2 + 3*u^3 - 3*u^4 - 2*u^5 + u^6 + u^7",
							"1 + u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 + u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 + u^2 - u^3 + 2*u^4 + u^7",
							"1 - u - 3*u^2 + 3*u^3 + 3*u^4 - 2*u^5 - u^6 + u^7",
							"1 - u - 2*u^2 + 3*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7",
							"-1 - u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 - 2*u + u^2 + 2*u^3 - 2*u^4 + u^7",
							"-1 - u + 2*u^2 + 3*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7"
						],
						"uPolys":[
							"1 + 2*u^3 - u^4 + u^5 + u^7",
							"-1 - u + 3*u^2 + 3*u^3 - 3*u^4 - 2*u^5 + u^6 + u^7",
							"1 + u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 + u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 + u^2 - u^3 + 2*u^4 + u^7",
							"1 - u - 3*u^2 + 3*u^3 + 3*u^4 - 2*u^5 - u^6 + u^7",
							"1 - u - 2*u^2 + 3*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7",
							"-1 - u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 - 2*u + u^2 + 2*u^3 - 2*u^4 + u^7",
							"-1 - u + 2*u^2 + 3*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7"
						],
						"aCuspShape":"-3 - 11*u - 2*u^2 + 10*u^3 + 4*u^4 - 5*u^5 - 3*u^6",
						"RepresentationsN":[
							[
								"u->1.06063 + 0.467862 I",
								"a->0.094535 + 0.998646 I",
								"b->-0.498285 - 0.549564 I"
							],
							[
								"u->1.06063 - 0.467862 I",
								"a->0.094535 - 0.998646 I",
								"b->-0.498285 + 0.549564 I"
							],
							[
								"u->0.719538",
								"a->2.07355",
								"b->0.93149"
							],
							[
								"u->-0.636439 + 0.197997 I",
								"a->1.36182 - 0.54122 I",
								"b->0.85369 + 1.27696 I"
							],
							[
								"u->-0.636439 - 0.197997 I",
								"a->1.36182 + 0.54122 I",
								"b->0.85369 - 1.27696 I"
							],
							[
								"u->-1.28396 + 0.82422 I",
								"a->0.006867 - 0.472371 I",
								"b->-0.821146 + 0.390568 I"
							],
							[
								"u->-1.28396 - 0.82422 I",
								"a->0.006867 + 0.472371 I",
								"b->-0.821146 - 0.390568 I"
							]
						],
						"Epsilon":2.05428,
						"uPolys_ij":[
							"-1 - u + 3*u^2 + 3*u^3 - 3*u^4 - 2*u^5 + u^6 + u^7",
							"-1 + 7*u - 21*u^2 + 33*u^3 - 29*u^4 + 16*u^5 - 5*u^6 + u^7",
							"-1 - u + 8*u^2 + 9*u^3 - 3*u^4 + 9*u^5 + 3*u^6 + u^7",
							"4 + 20*u + 35*u^2 + 25*u^3 + 11*u^4 + 11*u^5 + 6*u^6 + u^7",
							"-11 - u - 19*u^2 + 4*u^3 + 13*u^4 + 2*u^5 - 5*u^6 + u^7",
							"1 + u^2 - u^3 + 2*u^4 + u^7",
							"-49 - 38*u - 19*u^2 - 5*u^3 - 4*u^4 + u^6 + u^7",
							"-1 + 4*u + 2*u^2 + 17*u^3 - u^4 + 10*u^5 + u^7",
							"-1 + 2*u - 5*u^2 + 8*u^3 - 8*u^4 + 4*u^5 + u^7",
							"1 - 2*u + 5*u^2 - 3*u^3 + 4*u^4 - 2*u^5 + u^7",
							"1 - 3*u + 36*u^2 + 20*u^3 - 9*u^4 - 4*u^5 + 2*u^6 + u^7",
							"1 + 6*u - 5*u^2 + 15*u^3 - 8*u^4 + 8*u^5 - 2*u^6 + u^7",
							"1 + u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 + 15*u - 10*u^2 + 8*u^3 + 3*u^4 - 2*u^5 + u^7",
							"-1 - 2*u - u^2 + 2*u^3 + 2*u^4 + u^7",
							"-1 + 5*u - 16*u^2 + 29*u^3 - 33*u^4 + 21*u^5 - 7*u^6 + u^7",
							"4 - 8*u - u^2 + 10*u^3 + u^4 - 6*u^5 + u^7",
							"1 + 12*u + 44*u^2 + 51*u^3 + 36*u^4 + 20*u^5 + 7*u^6 + u^7",
							"4 - 2*u - 9*u^2 + 2*u^3 + 6*u^4 - u^5 + u^7",
							"1 - u - 2*u^2 + 3*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7",
							"1 + 2*u^3 - u^4 + u^5 + u^7",
							"1 - 2*u^2 + 4*u^3 - 3*u^4 + 5*u^5 - 2*u^6 + u^7",
							"1 + 5*u + 16*u^2 + 29*u^3 + 33*u^4 + 21*u^5 + 7*u^6 + u^7",
							"-1 - 2*u - u^2 + 16*u^3 + 32*u^4 + 24*u^5 + 8*u^6 + u^7",
							"-1 - u + 2*u^2 + 3*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7",
							"1 + 2*u + 5*u^2 + 8*u^3 + 8*u^4 + 4*u^5 + u^7",
							"23 + 37*u - u^2 + u^3 + 9*u^4 + 6*u^5 + 3*u^6 + u^7",
							"7 + 3*u - 29*u^2 + 42*u^3 - 33*u^4 + 18*u^5 - 5*u^6 + u^7",
							"-4 + 8*u - 15*u^2 + 2*u^3 + u^4 + 5*u^5 + 3*u^6 + u^7",
							"-16 + 44*u - 63*u^2 + 58*u^3 - 37*u^4 + 17*u^5 - 5*u^6 + u^7",
							"-1 + u + 4*u^2 - 2*u^3 - 7*u^4 + 3*u^5 + u^7"
						],
						"GeometricComponent":0,
						"uPolys_ij_N":[
							"-1 - u + 3*u^2 + 3*u^3 - 3*u^4 - 2*u^5 + u^6 + u^7",
							"-1 + 7*u - 21*u^2 + 33*u^3 - 29*u^4 + 16*u^5 - 5*u^6 + u^7",
							"-1 - u + 8*u^2 + 9*u^3 - 3*u^4 + 9*u^5 + 3*u^6 + u^7",
							"4 + 20*u + 35*u^2 + 25*u^3 + 11*u^4 + 11*u^5 + 6*u^6 + u^7",
							"-11 - u - 19*u^2 + 4*u^3 + 13*u^4 + 2*u^5 - 5*u^6 + u^7",
							"1 + u^2 - u^3 + 2*u^4 + u^7",
							"-49 - 38*u - 19*u^2 - 5*u^3 - 4*u^4 + u^6 + u^7",
							"-1 + 4*u + 2*u^2 + 17*u^3 - u^4 + 10*u^5 + u^7",
							"-1 + 2*u - 5*u^2 + 8*u^3 - 8*u^4 + 4*u^5 + u^7",
							"1 - 2*u + 5*u^2 - 3*u^3 + 4*u^4 - 2*u^5 + u^7",
							"1 - 3*u + 36*u^2 + 20*u^3 - 9*u^4 - 4*u^5 + 2*u^6 + u^7",
							"1 + 6*u - 5*u^2 + 15*u^3 - 8*u^4 + 8*u^5 - 2*u^6 + u^7",
							"1 + u^2 + 4*u^3 + 4*u^5 + u^7",
							"1 + 15*u - 10*u^2 + 8*u^3 + 3*u^4 - 2*u^5 + u^7",
							"-1 - 2*u - u^2 + 2*u^3 + 2*u^4 + u^7",
							"-1 + 5*u - 16*u^2 + 29*u^3 - 33*u^4 + 21*u^5 - 7*u^6 + u^7",
							"4 - 8*u - u^2 + 10*u^3 + u^4 - 6*u^5 + u^7",
							"1 + 12*u + 44*u^2 + 51*u^3 + 36*u^4 + 20*u^5 + 7*u^6 + u^7",
							"4 - 2*u - 9*u^2 + 2*u^3 + 6*u^4 - u^5 + u^7",
							"1 - u - 2*u^2 + 3*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7",
							"1 + 2*u^3 - u^4 + u^5 + u^7",
							"1 - 2*u^2 + 4*u^3 - 3*u^4 + 5*u^5 - 2*u^6 + u^7",
							"1 + 5*u + 16*u^2 + 29*u^3 + 33*u^4 + 21*u^5 + 7*u^6 + u^7",
							"-1 - 2*u - u^2 + 16*u^3 + 32*u^4 + 24*u^5 + 8*u^6 + u^7",
							"-1 - u + 2*u^2 + 3*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7",
							"1 + 2*u + 5*u^2 + 8*u^3 + 8*u^4 + 4*u^5 + u^7",
							"23 + 37*u - u^2 + u^3 + 9*u^4 + 6*u^5 + 3*u^6 + u^7",
							"7 + 3*u - 29*u^2 + 42*u^3 - 33*u^4 + 18*u^5 - 5*u^6 + u^7",
							"-4 + 8*u - 15*u^2 + 2*u^3 + u^4 + 5*u^5 + 3*u^6 + u^7",
							"-16 + 44*u - 63*u^2 + 58*u^3 - 37*u^4 + 17*u^5 - 5*u^6 + u^7",
							"-1 + u + 4*u^2 - 2*u^3 - 7*u^4 + 3*u^5 + u^7"
						],
						"Multiplicity":1,
						"ij_list":[
							[
								"{2, 6}",
								"{3, 6}",
								"{3, 7}"
							],
							[
								"{2, 3}",
								"{6, 7}"
							],
							[
								"{2, 7}"
							],
							[
								"{4, 10}"
							],
							[
								"{1, 9}"
							],
							[
								"{5, 10}",
								"{6, 10}"
							],
							[
								"{1, 6}"
							],
							[
								"{1, 4}"
							],
							[
								"{9, 10}"
							],
							[
								"{5, 6}"
							],
							[
								"{7, 9}"
							],
							[
								"{3, 10}"
							],
							[
								"{3, 9}",
								"{4, 8}",
								"{4, 9}",
								"{5, 8}"
							],
							[
								"{2, 4}"
							],
							[
								"{2, 9}",
								"{2, 10}",
								"{3, 5}"
							],
							[
								"{1, 10}"
							],
							[
								"{6, 9}"
							],
							[
								"{6, 8}"
							],
							[
								"{5, 7}"
							],
							[
								"{7, 10}"
							],
							[
								"{1, 5}",
								"{2, 5}"
							],
							[
								"{1, 2}"
							],
							[
								"{7, 8}"
							],
							[
								"{3, 4}",
								"{4, 5}",
								"{8, 9}"
							],
							[
								"{1, 7}",
								"{1, 8}"
							],
							[
								"{3, 8}",
								"{5, 9}"
							],
							[
								"{4, 6}"
							],
							[
								"{4, 7}"
							],
							[
								"{2, 8}"
							],
							[
								"{1, 3}"
							],
							[
								"{8, 10}"
							]
						],
						"SortedReprnIndices":"{6, 7, 4, 5, 2, 1, 3}",
						"aCuspShapeN":[
							"-1.2910786889545153003`5.002844103653789 + 1.274168192501301239`4.997118150541733*I",
							"-1.2910786889545153003`5.002844103653789 - 1.274168192501301239`4.997118150541733*I",
							-8.5336,
							"1.8245058089865441365`5.135744226339022 - 0.4840574744321085765`4.559495906442394*I",
							"1.8245058089865441365`5.135744226339022 + 0.4840574744321085765`4.559495906442394*I",
							"-3.2666345141532545005`4.71066616739667 - 8.3797272472905323044`5.119795503993515*I",
							"-3.2666345141532545005`4.71066616739667 + 8.3797272472905323044`5.119795503993515*I"
						],
						"Abelian":false
					},
					{
						"IdealName":"abJ10_102_2",
						"Generators":[
							"b",
							"-1 + a",
							"-1 + v"
						],
						"VariableOrder":[
							"b",
							"a",
							"v"
						],
						"Characteristic":0,
						"KnownGroebner":[],
						"Status":[
							"vCompNormalize"
						],
						"MonomialOrder":"lex",
						"IsHomogeneous":false,
						"IsZeroDim":true,
						"IdealDimension":0,
						"Timings":{
							"TimingGroebner":8.2546e-2,
							"TimingZeroDimVars":7.0025e-2,
							"TimingmagmaVCompNormalize":7.1394e-2,
							"TimingNumberOfSols":2.8495e-2,
							"TimingIsRadical":1.941e-3,
							"TimingArcColoring":6.9616e-2,
							"TimingObstruction":4.07e-4,
							"TimingComplexVolumeN":0.374704,
							"TimingaCuspShapeN":4.5709999999999995e-3,
							"TiminguValues":0.637251,
							"TiminguPolysN":7.6e-5,
							"TiminguPolys":0.812787,
							"TimingaCuspShape":0.102847,
							"TimingRepresentationsN":2.5414e-2,
							"TiminguValues_ij":0.149351,
							"TiminguPoly_ij":0.147053,
							"TiminguPolys_ij_N":3.1e-5
						},
						"ZeroDimensionalVars":[
							"b",
							"a",
							"v"
						],
						"NumberOfSols":1,
						"IsRadical":true,
						"ArcColoring":[
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}",
							"{1, 0}"
						],
						"Obstruction":1,
						"ComplexVolumeN":"{0}",
						"uPolysN":[
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u"
						],
						"uPolys":[
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u",
							"u"
						],
						"aCuspShape":0,
						"RepresentationsN":[
							[
								"v->1.",
								"a->1.",
								"b->0"
							]
						],
						"Epsilon":"Infinity",
						"uPolys_ij":[
							"u"
						],
						"GeometricComponent":0,
						"uPolys_ij_N":[
							"u"
						],
						"Multiplicity":1,
						"ij_list":[
							[
								"{1, 2}",
								"{1, 3}",
								"{1, 4}",
								"{1, 5}",
								"{1, 6}",
								"{1, 7}",
								"{1, 8}",
								"{1, 9}",
								"{1, 10}",
								"{2, 3}",
								"{2, 4}",
								"{2, 5}",
								"{2, 6}",
								"{2, 7}",
								"{2, 8}",
								"{2, 9}",
								"{2, 10}",
								"{3, 4}",
								"{3, 5}",
								"{3, 6}",
								"{3, 7}",
								"{3, 8}",
								"{3, 9}",
								"{3, 10}",
								"{4, 5}",
								"{4, 6}",
								"{4, 7}",
								"{4, 8}",
								"{4, 9}",
								"{4, 10}",
								"{5, 6}",
								"{5, 7}",
								"{5, 8}",
								"{5, 9}",
								"{5, 10}",
								"{6, 7}",
								"{6, 8}",
								"{6, 9}",
								"{6, 10}",
								"{7, 8}",
								"{7, 9}",
								"{7, 10}",
								"{8, 9}",
								"{8, 10}",
								"{9, 10}"
							]
						],
						"SortedReprnIndices":"{1}",
						"aCuspShapeN":"{0}",
						"Abelian":true
					}
				]
			},
			"uPolyC":[
				"(1 + 2*u^3 - u^4 + u^5 + u^7)*(419 - 1000*u - 1869*u^2 + 7315*u^3 + 486*u^4 - 24151*u^5 + 16003*u^6 + 48821*u^7 - 60200*u^8 - 67786*u^9 + 132027*u^10 + 63487*u^11 - 214160*u^12 - 24292*u^13 + 277370*u^14 - 45310*u^15 - 294429*u^16 + 120352*u^17 + 257837*u^18 - 167067*u^19 - 187210*u^20 + 167009*u^21 + 115171*u^22 - 130179*u^23 - 63529*u^24 + 82800*u^25 + 33892*u^26 - 44940*u^27 - 17679*u^28 + 21853*u^29 + 7991*u^30 - 9631*u^31 - 2564*u^32 + 3683*u^33 + 294*u^34 - 1073*u^35 + 170*u^36 + 201*u^37 - 107*u^38 - 7*u^39 + 24*u^40 - 4*u^41 - 3*u^42 + u^43)",
				"(-1 - u + 3*u^2 + 3*u^3 - 3*u^4 - 2*u^5 + u^6 + u^7)*(-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43)",
				"(1 + u^2 + 4*u^3 + 4*u^5 + u^7)*(-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43)",
				"(1 + u^2 + 4*u^3 + 4*u^5 + u^7)*(-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43)",
				"(1 + u^2 - u^3 + 2*u^4 + u^7)*(-1 + 2*u + 2*u^2 + 6*u^3 - 48*u^4 + 58*u^5 - 102*u^6 + 332*u^7 - 1036*u^8 + 2293*u^9 - 2813*u^10 + 2305*u^11 - 3206*u^12 + 1708*u^13 - 6066*u^14 + 1226*u^15 - 2177*u^16 - 1354*u^17 - 1434*u^18 + 634*u^19 - 60*u^20 - 696*u^21 + 1086*u^22 + 730*u^23 + 1603*u^24 - 283*u^25 + 407*u^26 + 487*u^27 + 455*u^28 - 200*u^29 - 311*u^30 + 363*u^31 - 187*u^32 - 101*u^33 - 113*u^34 + 80*u^35 - 50*u^36 - 6*u^37 + 14*u^39 - 2*u^40 + u^41 + u^42 + u^43)",
				"(1 - u - 3*u^2 + 3*u^3 + 3*u^4 - 2*u^5 - u^6 + u^7)*(-1 - 7*u - 10*u^2 + 23*u^3 + 56*u^4 + 121*u^5 + 50*u^6 - 791*u^7 - 734*u^8 + 2040*u^9 + 1960*u^10 - 2691*u^11 - 2246*u^12 + 962*u^13 - 158*u^14 + 3150*u^15 + 4387*u^16 - 6671*u^17 - 6524*u^18 + 6541*u^19 + 3780*u^20 - 3233*u^21 + 2004*u^22 + 183*u^23 - 6351*u^24 + 255*u^25 + 6886*u^26 + 1192*u^27 - 4755*u^28 - 2446*u^29 + 2307*u^30 + 2476*u^31 - 796*u^32 - 1671*u^33 + 189*u^34 + 813*u^35 - 28*u^36 - 289*u^37 + 2*u^38 + 73*u^39 - 12*u^41 + u^43)",
				"(1 - u - 2*u^2 + 3*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7)*(-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43)",
				"(-1 - u^2 + 4*u^3 + 4*u^5 + u^7)*(-1 + 10*u - 36*u^2 + 59*u^3 - 72*u^4 + 301*u^5 - 183*u^6 + 83*u^7 + 388*u^8 - 1613*u^9 + 3501*u^10 - 4549*u^11 + 5650*u^12 - 3566*u^13 - 934*u^14 + 4764*u^15 - 15219*u^16 + 16010*u^17 - 29926*u^18 + 26305*u^19 - 42176*u^20 + 37157*u^21 - 44971*u^22 + 51811*u^23 - 27933*u^24 + 68295*u^25 + 1451*u^26 + 75466*u^27 + 21215*u^28 + 64323*u^29 + 22012*u^30 + 40833*u^31 + 12941*u^32 + 19019*u^33 + 4991*u^34 + 6405*u^35 + 1294*u^36 + 1519*u^37 + 219*u^38 + 241*u^39 + 22*u^40 + 23*u^41 + u^42 + u^43)",
				"(1 - 2*u + u^2 + 2*u^3 - 2*u^4 + u^7)*(-1 + 18*u - 128*u^2 + 453*u^3 - 888*u^4 + 1301*u^5 - 2641*u^6 + 5475*u^7 - 7248*u^8 + 7757*u^9 - 13407*u^10 + 23685*u^11 - 23968*u^12 + 11136*u^13 - 10902*u^14 + 39070*u^15 - 66121*u^16 + 57308*u^17 - 24976*u^18 + 6615*u^19 - 10296*u^20 + 17073*u^21 - 17753*u^22 + 15085*u^23 - 10045*u^24 + 1869*u^25 + 3291*u^26 - 1314*u^27 - 3877*u^28 + 6607*u^29 - 5898*u^30 + 4013*u^31 - 2451*u^32 + 1751*u^33 - 1571*u^34 + 1359*u^35 - 876*u^36 + 405*u^37 - 161*u^38 + 87*u^39 - 54*u^40 + 25*u^41 - 7*u^42 + u^43)",
				"(-1 - u + 2*u^2 + 3*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7)*(-19 + 85*u - 77*u^2 - 275*u^3 + 913*u^4 - 675*u^5 - 2293*u^6 + 5908*u^7 - 1115*u^8 - 12781*u^9 + 12716*u^10 + 8025*u^11 - 16588*u^12 + 12370*u^13 - 10416*u^14 - 23886*u^15 + 53805*u^16 + 5623*u^17 - 63395*u^18 + 18503*u^19 + 22051*u^20 - 12037*u^21 + 27887*u^22 - 17654*u^23 - 43868*u^24 + 34710*u^25 + 29193*u^26 - 26368*u^27 - 10264*u^28 + 8978*u^29 + 927*u^30 + 1431*u^31 + 903*u^32 - 3305*u^33 - 494*u^34 + 1885*u^35 + 125*u^36 - 631*u^37 - 17*u^38 + 134*u^39 + u^40 - 17*u^41 + u^43)"
			],
			"RileyPolyC":[
				"(-1 + 2*y^2 + 4*y^3 + 3*y^4 + 5*y^5 + 2*y^6 + y^7)*(-175561 + 2566222*y - 18530429*y^2 + 90217379*y^3 - 340940512*y^4 + 1081872889*y^5 - 3001433725*y^6 + 7400553039*y^7 - 16308073726*y^8 + 32227911446*y^9 - 57382166923*y^10 + 92630030031*y^11 - 136557936782*y^12 + 185276676994*y^13 - 233121064870*y^14 + 273935394038*y^15 - 302343185917*y^16 + 314579915476*y^17 - 308913293417*y^18 + 285912152737*y^19 - 248613215138*y^20 + 202270808215*y^21 - 153368495711*y^22 + 108044353245*y^23 - 70595731461*y^24 + 42766336274*y^25 - 24032678768*y^26 + 12533098604*y^27 - 6057953949*y^28 + 2701215119*y^29 - 1100405103*y^30 + 403207645*y^31 - 129956752*y^32 + 35723319*y^33 - 8008860*y^34 + 1363727*y^35 - 157120*y^36 + 13581*y^37 - 4709*y^38 + 2451*y^39 - 760*y^40 + 146*y^41 - 17*y^42 + y^43)",
				"(-1 + 7*y - 21*y^2 + 33*y^3 - 29*y^4 + 16*y^5 - 5*y^6 + y^7)*(-1 + 29*y - 310*y^2 + 55*y^3 + 13036*y^4 - 66665*y^5 + 54508*y^6 + 790751*y^7 - 4355940*y^8 + 12084128*y^9 - 19874496*y^10 + 13858879*y^11 + 21931058*y^12 - 82570640*y^13 + 125248818*y^14 - 91467388*y^15 - 33175929*y^16 + 179849523*y^17 - 237149372*y^18 + 149635385*y^19 + 23428910*y^20 - 155423549*y^21 + 160325290*y^22 - 54854361*y^23 - 74712671*y^24 + 152163817*y^25 - 158947110*y^26 + 122975250*y^27 - 80277845*y^28 + 49720976*y^29 - 32288533*y^30 + 22094456*y^31 - 14714078*y^32 + 8849383*y^33 - 4622913*y^34 + 2063159*y^35 - 779736*y^36 + 247387*y^37 - 65052*y^38 + 13891*y^39 - 2330*y^40 + 290*y^41 - 24*y^42 + y^43)",
				"(-1 - 2*y - y^2 + 16*y^3 + 32*y^4 + 24*y^5 + 8*y^6 + y^7)*(-1 + 28*y - 260*y^2 + 3951*y^3 + 19594*y^4 + 76721*y^5 + 54407*y^6 - 521155*y^7 - 1485028*y^8 - 1356737*y^9 - 2047479*y^10 - 5369337*y^11 + 7096094*y^12 + 68359666*y^13 + 175468592*y^14 + 240732194*y^15 + 55742417*y^16 - 668460270*y^17 - 1964390254*y^18 - 3108586767*y^19 - 2703235988*y^20 + 398506987*y^21 + 6201064639*y^22 + 13488196827*y^23 + 20341782427*y^24 + 24841569273*y^25 + 25818617757*y^26 + 23350540284*y^27 + 18601227875*y^28 + 13131775251*y^29 + 8220795160*y^30 + 4544046395*y^31 + 2200410573*y^32 + 924381903*y^33 + 333316749*y^34 + 101999219*y^35 + 26158590*y^36 + 5538853*y^37 + 949947*y^38 + 128541*y^39 + 13202*y^40 + 967*y^41 + 45*y^42 + y^43)",
				"(-1 - 2*y - y^2 + 16*y^3 + 32*y^4 + 24*y^5 + 8*y^6 + y^7)*(-1 + 28*y - 260*y^2 + 3951*y^3 + 19594*y^4 + 76721*y^5 + 54407*y^6 - 521155*y^7 - 1485028*y^8 - 1356737*y^9 - 2047479*y^10 - 5369337*y^11 + 7096094*y^12 + 68359666*y^13 + 175468592*y^14 + 240732194*y^15 + 55742417*y^16 - 668460270*y^17 - 1964390254*y^18 - 3108586767*y^19 - 2703235988*y^20 + 398506987*y^21 + 6201064639*y^22 + 13488196827*y^23 + 20341782427*y^24 + 24841569273*y^25 + 25818617757*y^26 + 23350540284*y^27 + 18601227875*y^28 + 13131775251*y^29 + 8220795160*y^30 + 4544046395*y^31 + 2200410573*y^32 + 924381903*y^33 + 333316749*y^34 + 101999219*y^35 + 26158590*y^36 + 5538853*y^37 + 949947*y^38 + 128541*y^39 + 13202*y^40 + 967*y^41 + 45*y^42 + y^43)",
				"(-1 - 2*y - 5*y^2 - 3*y^3 - 4*y^4 - 2*y^5 + y^7)*(-1 + 8*y - 76*y^2 + 256*y^3 - 1944*y^4 + 5246*y^5 - 29772*y^6 - 69996*y^7 - 119682*y^8 - 63263*y^9 - 4163295*y^10 - 17377331*y^11 - 36550558*y^12 - 51320276*y^13 - 58097882*y^14 - 36264266*y^15 - 14109919*y^16 + 13299074*y^17 + 24195074*y^18 + 33148364*y^19 + 14575914*y^20 + 12679526*y^21 - 5595586*y^22 - 3775162*y^23 - 9065351*y^24 - 1925765*y^25 - 2895647*y^26 + 2039031*y^27 + 189781*y^28 + 1498100*y^29 + 9817*y^30 + 305481*y^31 - 174541*y^32 + 10271*y^33 - 56171*y^34 + 4896*y^35 - 6088*y^36 + 2722*y^37 - 184*y^38 + 444*y^39 + 12*y^40 + 33*y^41 + y^42 + y^43)",
				"(-1 + 7*y - 21*y^2 + 33*y^3 - 29*y^4 + 16*y^5 - 5*y^6 + y^7)*(-1 + 29*y - 310*y^2 + 55*y^3 + 13036*y^4 - 66665*y^5 + 54508*y^6 + 790751*y^7 - 4355940*y^8 + 12084128*y^9 - 19874496*y^10 + 13858879*y^11 + 21931058*y^12 - 82570640*y^13 + 125248818*y^14 - 91467388*y^15 - 33175929*y^16 + 179849523*y^17 - 237149372*y^18 + 149635385*y^19 + 23428910*y^20 - 155423549*y^21 + 160325290*y^22 - 54854361*y^23 - 74712671*y^24 + 152163817*y^25 - 158947110*y^26 + 122975250*y^27 - 80277845*y^28 + 49720976*y^29 - 32288533*y^30 + 22094456*y^31 - 14714078*y^32 + 8849383*y^33 - 4622913*y^34 + 2063159*y^35 - 779736*y^36 + 247387*y^37 - 65052*y^38 + 13891*y^39 - 2330*y^40 + 290*y^41 - 24*y^42 + y^43)",
				"(-1 + 5*y - 16*y^2 + 29*y^3 - 33*y^4 + 21*y^5 - 7*y^6 + y^7)*(-361 + 4299*y - 17985*y^2 + 14343*y^3 + 146549*y^4 - 468029*y^5 - 1475939*y^6 + 18564798*y^7 - 84915601*y^8 + 232751759*y^9 - 380300664*y^10 + 211750615*y^11 + 635550056*y^12 - 1934339668*y^13 + 2434441906*y^14 - 662082822*y^15 - 3250052787*y^16 + 6692849969*y^17 - 6345289941*y^18 + 1394347661*y^19 + 5125555965*y^20 - 8645682389*y^21 + 6935497995*y^22 - 1743583116*y^23 - 3136954086*y^24 + 5094896654*y^25 - 4170543553*y^26 + 2073143706*y^27 - 384288640*y^28 - 354068780*y^29 + 407670987*y^30 - 225453737*y^31 + 71289773*y^32 - 3041361*y^33 - 11311476*y^34 + 7902003*y^35 - 3329535*y^36 + 1023811*y^37 - 240347*y^38 + 43214*y^39 - 5819*y^40 + 557*y^41 - 34*y^42 + y^43)",
				"(-1 - 2*y - y^2 + 16*y^3 + 32*y^4 + 24*y^5 + 8*y^6 + y^7)*(-1 + 28*y - 260*y^2 + 3951*y^3 + 19594*y^4 + 76721*y^5 + 54407*y^6 - 521155*y^7 - 1485028*y^8 - 1356737*y^9 - 2047479*y^10 - 5369337*y^11 + 7096094*y^12 + 68359666*y^13 + 175468592*y^14 + 240732194*y^15 + 55742417*y^16 - 668460270*y^17 - 1964390254*y^18 - 3108586767*y^19 - 2703235988*y^20 + 398506987*y^21 + 6201064639*y^22 + 13488196827*y^23 + 20341782427*y^24 + 24841569273*y^25 + 25818617757*y^26 + 23350540284*y^27 + 18601227875*y^28 + 13131775251*y^29 + 8220795160*y^30 + 4544046395*y^31 + 2200410573*y^32 + 924381903*y^33 + 333316749*y^34 + 101999219*y^35 + 26158590*y^36 + 5538853*y^37 + 949947*y^38 + 128541*y^39 + 13202*y^40 + 967*y^41 + 45*y^42 + y^43)",
				"(-1 + 2*y - 5*y^2 + 8*y^3 - 8*y^4 + 4*y^5 + y^7)*(-1 + 68*y - 1852*y^2 + 19435*y^3 - 103330*y^4 + 359485*y^5 - 1201005*y^6 + 3766465*y^7 - 10776344*y^8 + 28672451*y^9 - 65409867*y^10 + 120289739*y^11 - 185664726*y^12 + 248328598*y^13 - 302845024*y^14 + 329549570*y^15 - 331440911*y^16 + 299824826*y^17 - 277018878*y^18 + 182288601*y^19 - 168893756*y^20 + 90218767*y^21 - 68613789*y^22 + 38125131*y^23 - 17225621*y^24 + 11425269*y^25 - 4047903*y^26 + 177292*y^27 - 430573*y^28 - 627437*y^29 + 912940*y^30 + 52335*y^31 + 455493*y^32 + 152055*y^33 + 63413*y^34 + 58299*y^35 - 1190*y^36 + 10013*y^37 - 601*y^38 + 885*y^39 - 10*y^40 + 43*y^41 + y^42 + y^43)",
				"(-1 + 5*y - 16*y^2 + 29*y^3 - 33*y^4 + 21*y^5 - 7*y^6 + y^7)*(-361 + 4299*y - 17985*y^2 + 14343*y^3 + 146549*y^4 - 468029*y^5 - 1475939*y^6 + 18564798*y^7 - 84915601*y^8 + 232751759*y^9 - 380300664*y^10 + 211750615*y^11 + 635550056*y^12 - 1934339668*y^13 + 2434441906*y^14 - 662082822*y^15 - 3250052787*y^16 + 6692849969*y^17 - 6345289941*y^18 + 1394347661*y^19 + 5125555965*y^20 - 8645682389*y^21 + 6935497995*y^22 - 1743583116*y^23 - 3136954086*y^24 + 5094896654*y^25 - 4170543553*y^26 + 2073143706*y^27 - 384288640*y^28 - 354068780*y^29 + 407670987*y^30 - 225453737*y^31 + 71289773*y^32 - 3041361*y^33 - 11311476*y^34 + 7902003*y^35 - 3329535*y^36 + 1023811*y^37 - 240347*y^38 + 43214*y^39 - 5819*y^40 + 557*y^41 - 34*y^42 + y^43)"
			]
		},
		"GeometricRepresentation":[
			1.37273e1,
			[
				"J10_102_0",
				1,
				"{33, 34}"
			]
		]
	}
}