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DBg/v37z958mTFbarSpEmT+/fv9+rVKzAwMCkpqWfPnqoQtmrUqNG3b985c+YUFRW1bNny1atXT5482bZtW+PGjdWuHy0sLLKzs1NSUhjSAAB8iNb8+fNphWJXrlzZsGHDli1bLC0tv/5oFy5c6NKly4e+q6enJwiChoZGixYt2rZtO2HCBC0tLRsbG6VnwUePHt27d69Xr15q8XC8j5BIJOfOnVPEmu4ncY0gAEAtsCL4/7l48eLhw4e3bt1qaGgolwOW/I6W6tWrHzx4MCwszNnZOSkpSfzP/vbt2wcPHsj+7eHh8fTp0/Pnz6t7hzo6Ol6+fJmBXSopK2qXqXJpZMrl72SCYBmyffv2v/76a9WqVZqacmuTSpUqvXz5soQv1tbWnj9/vqen57Rp0/z9/UX74Hl5eevWrfPy8ipfvnzxFxcvXnzo0KF79+6pe1awtrYODw9neAMAQBD8oJ07d6amps6fP1+OKVAQBCsrq4cPH37WW+rXrx8QECCRSHr37v348WNFf/CDBw+6urq2bNly1apV794ZrampuXr16kWLFqnLA0U+5Mcff2RnaQAACIIfdP369YiIiEmTJsn9yHXq1Ck+3/pZnJ2dN23atGDBAk9Pz9zcXEV86qioqGHDhr19+3bfvn3Nmzd//wXly5efN2+eu7u7WnduixYtbt++zSAHAIAg+B/CwsJ27Njh7e2tiIPXq1cvNDT0y95rZma2c+fOLl26uLm57d69u6CgQF61unfv3q+//rpr165Vq1aNGDHiI4ugdnZ2P/7448yZM9W3fzU0NHR1dbOyspjqAAAQBP+tqKho/fr1Ctompnz58jk5OV9zhHbt2u3YsaOoqMjJyWnnzp2FhYVfc7QHDx64ubmdOnXKy8tr7ty5lStX/uRb+vXrZ2xsvGnTJvXt4hYtWnzZuiwAAATB0ikiImLlypWCINjY2Hzxs4NLQiKRZGZmfs0RNDQ0XF1djx8/np+f37t3761bt37u+lZ+fv7hw4cHDx584MCBJUuWzJ4928DAoORv//XXX2/evHnnzh017evGjRuHhYUx1QEAIAgKgiBIpdLly5d/5VpdyVOIXK5R09HRGTFixOHDh/X19YcMGeLu7n7mzJmPJ8L8/PwrV65Mnz595MiRubm5/v7+8+fPNzIy+oLSfX19fXx8srOz1bG769WrFx0dzVQHAOB9GiXf606lfE21jx49mpmZGRUVNWfOHEXXMzw8/OjRo3K/zC4pKen8+fPBwcG5ubmyy+AMDAwkEolUKk1PTy8sLCwqKtLW1m7YsGGHDh1MTEy+vsQHDx4sXrx4+/btCl1AVZCxY8du3LhR1HnFRlmKb2Gl/OwqU+XSyJRbmsrFh2iXtQ98//79evXqiba3nLW19dKlS+V+2KpVq7q6urq6usr+W1hYmJSUVFhYaGBgULFiRflugiNja2s7YsQId3f3rVu3qt8o19ZmqgMA8L6ydWo4Pz//6dOn9evXL2WfS0tLy8zMzNLSslKlSopIgTKdO3du27atOt44kpeXx1QHAKCsB8FDhw6ZmZndvn376dOnCQkJ4lw6VqtWradPn5aOBhwxYkRCQkJQUJDaBWWmOgAAZT0Itm/fvmLFivr6+tnZ2To6OuXKlROh0NatW1+7dq3UtKGnp+eBAwfOnj2rTqNck43TAQAo80HQ1NTU2to6Nzc3MjIyOjo6KSlJhEJbtGjxzz//lJo21NLSWrNmzZkzZw4ePKgudf7K/RcBACityuJF9HXq1Fm/fr04y4GCIBgaGqanp5eyNly5cuXs2bOLior69++v+rXlDjUAAMp6EExPT5dKpRUrVpRIJCIXraOjU1BQUMruXfXx8Vm/fv2qVasmTZokO/fq6elZt25d2ceUSCROTk4qUlV13PIGAAARlKFTw97e3hkZGUopum7dulFRUaWvScePH29jYzNo0KDk5OQ3b97cv3//zp07t27dOnPmTEREhOrUUyqVMtUBAHhfWVkRzMrKSklJMTc3V0rp9erVi4qKqlOnTulr2G7dujVo0ODGjRsNGjTw9/evUqWKIAgBAQGDBw9WkRomJydbWFgw1QEAKLtB8ODBg0q8mq127do3btworW1raWlpaWlZ/N9r1641bNhQdR6t8eDBg7p16zLVAQAou0Hw7Nmz27dvV1bpNWrUUKN7bL9GQUHB/v3716xZo9BSioqKXr9+nZKS8vr167dv32ZkZOTk5BQUFAiCoKOjI5FIKlSo0KFDB9n2gTdu3Bg4cCBTHQCAMhoEY2NjLSwslLirsEQiyc7OLgtNfeLECdnZYUEQEhIS3r59+5XPcXn79u2TJ08iIyOfPXsWGxsre0aIhoaGiYmJqalplSpVKleubGZmpq+vr6OjU1RUlJ+fn56e/vr16+IlyYiIiFq1ajHVAQAoo0Hw2LFjvXr1orNFcPr06WbNmsn+Xb58+QMHDjx+/LhcuXL169e3sbGpVavWt99+W6FChX+9KzMz89WrV8nJyc+fP4+Pj4+Pj09KSpLt+fLNN9/Url27Tp06/fv3r1Gjxudu+pOVlaWnpyf7d1FR0ejRo7t06dK3b1/RNg8CAIAgqGTBwcEeHh50tggiIiLatm0r+3flypV/++03QRAKCwufPn0aGRl55cqVlJSUzMzMdzf209DQ0NXV/eabb4yMjKpWrfrdd9+ZmZkZGRnJ62+Anj17Fhe0adOmy5cv//bbb0VFRT179uzQoQNdplIyMzPF392poKAgNzdXKeUKgiD+rlKZmZnly5dXSrniNzLlMonwaUXqSVpi2dnZo0aNkirbjBkzpGXAjh07IiMjVac+rq6ueXl57389KyvLz89v4MCBV65cUUS5Rfh8ycnJgiCsX78+Pz//ky+W48+ukJAQU1PTwMBAkcs9efKkqanpyZMnS/JiOZY7YcIEe3v7kJAQMQstKipydnbu0qVLVFSUyOWampo6OzsnJyeLWW5GRoapqamXl1dGRoaY5SprEskGc2BgoMiDOTAw0NTUNCgoiJ+fX6P07yP48OFDBwcHEr84Bg8erDoX5D19+tTQ0PA//1jU1dUdOXLk1q1bb9y4MWzYsJiYGPpO6YyNjTMyMq5du2ZpaXnq1CnRyrWzs7t+/fq2bdscHByuXr0qWrk9evQ4e/bsrFmzHB0do6OjRSt37dq1vr6+Xbt2dXFxSUlJEa3cgICA4cOHt2rVauLEiZmZmaKVGxcX17p1axMTkw0bNsgWkEQgkUgiIyNfvXplZWW1e/du0co1NjZOTk4WfxL16NFDNokaNmwYGhoqWrkuLi4HDhzw8PAQeRKxIqhmK4Lbtm0LDg5W7rpUYWHhzJkzpRDX9OnTb9++/cmXJScnu7m5bdu2jRVBFREVFWVvb29vb/+R1SNF/OwKCgr65OqRIsqVrWpMmDDhI6tHci83Pz9//fr1giB4eXl9aPVIER82IyPDy8vr40uwCirX2dn540uwiig3KiqqS5cu9vb2H1m1UkS5ISEh9vb2H1+CVUS5sqVBkSdRfn5+SSYRPtgjpT4IzpkzJycnR7mJJDo6evXq1SQzMb18+XLAgAElf/3BgwdHjhwZERFBEJTDjxX5cXZ2/s+48J+/S+RY7ofikaLL/dDJtffLzc/Pl2O5/xlT/vPDyrHcD52h/s9y5fhcKHt7+/+MKYru3A/FI0WXO2HCBGVNopIHQREmEcruqeH8/Hyl3yJ69+5da2trlp/FtHnz5mnTppX89X379l29evWqVasOHz5M6yn9PEPx+o2Tk1PJrwSXy/qNs7Ozvb19586dRS5XtgjaunXrEhaqra0tx0XQkm+6LpdyZes3HTp0KPmVJBKJRF6LoP369atUqZKYg9nLy0sQBCcnJ5HLlU2ibt26iTyYZYugnTt3FvOHRvEiaMknEcrKqWFVuEtj+vTpiYmJrNKJJjs7e8iQIV/23gULFvj6+rIiqCyyszwfP2WpiLNLxb+tP37XiCLK/eQpS0WUq9xTlmXkvH8JT1kq7rz/x+8aUcRgnjBhwidvvZJ7ucnJySWZRCi7K4KqID4+3sTEhHYQzeLFi0ePHv1l750zZ46hoeGMGTNkm1dDTFevXrW0tDxx4kRycvK8efNE2xVi9+7dVlZWr169ysjIcHFxEafcgoKCDRs2GBgY1K9fPy4urkePHuJ82MzMTG9v71atWg0fPvz27dtt2rQRp9yUlBQXF5euXbsuXrz4/v37NWrUEKfc6OhoR0dHDw+Ps2fP7t6929jYWJxyQ0NDHRwctm3bdv369bVr14q2tcqpU6csLS2vXbuWnJw8btw40QazbBIZGRlFRkaKOYm8vb1NTExat24t5iQqZdh9R+GuX79evMcyRBAeHh4bG/s1ZwdcXV3r1KkzcuTIP/74g62nRZOSkuLh4XHgwAHRoklx+pT9thYtmsicPXtW9ttatGgiM3v2bEEQIiMjRd71beLEia1btw4ICBB517fevXvPmDFjwIABYpabmZnZtWtX8QdzSkrKrFmzzp49a2dnJ/JgVsok2r9/f0REREZGhlK2bCw1NOR7kaZoSl7tWbNmLV68WIlVdXd39/HxkdcOyfikPn36bNq06dtvv/3K4wQHB+/evXvVqlVfMq/+3wPuoKifXBrK+dlVpsqlkSm3NJWLD+HUsGI9efKkQoUKpEAx/0D8/vvvvz4FCoLQtGnTtm3bLlu2jFYFABAE8dmkUqm3t/fMmTNpCnG8evXq1KlT7u7u8jrgjz/+aGho6OfnR9sCAAiC+Dy+vr59+vRhOVA0Y8eOnTt3rnxPy44ZMyY+Pv706dM0LwCAIIiSevLkyf379/v160dTiBa7v/vuu9q1a8v9yJ6engEBAYmJiTQyAIAgqGaUclFqUlLS+PHjlyxZwggTR2ho6N9//+3h4aGQSaKpuXr1auXecgQAAEFQPURERHh4eGzZsoWTwuJ49erVb7/9tnnzZsUVUbVq1RYtWvz555+0NgCAIKhO9PX15fiQyk+6cOHC/PnzAwICqlWrxvASx/Tp09esWVOxYkWFluLi4nLs2DFOEAMACILqpEGDBrdv3xahoIyMjF9//fX48eMBAQFsbikaf3//li1b1qxZU4SyFi5cOH/+fNocAEAQVBstW7a8ePGiQovIyspavXr1+PHjBw4cuGbNGp5FIZqLFy/euXPHzc1NnOKqV69er169q1ev0vLKUlBQ8MmviFCoOOVmZma+X6hSPq8Ihf7n533/K6Xp8yprML9figjtrKxJBIKgIAiChYXF06dPFXTwp0+fzpo1y8XFRfZMSR4lJ6bIyMi1a9euW7dOzEInTJgQGBhI4yvLkCFDUlJSin+LeHt7x8fHi1Cui4tL8S/LgoICFxeX3NxcEcqdOHFi8S/LlJSUIUOGiFDozZs3vb29i8uNjo7u3r27COUePXp09+7dxf8NDQ2VPQ1P0TZv3vzuX3enTp3av3+/COX++uuv0dHRxf/dsGHDzZs3FV2otrb2vybRxIkTi/+rOLm5uY6OjsWTKDMz09HRUZxJhE+PirLwIWvUqBEVFSXHs4epqaknTpw4evSoiYnJqFGjGjduzEgSWU5Ozvjx47dt2ybyc0u1tLTs7Oxu3rzZokULekF8Y8eONTExOXnypCAI3bt3NzY2FuHZptra2k5OTlZWVmfPnhUEwdLScsyYMSJc/iGRSIyMjBwcHM6fPy8Igr29/cqVK0UY8G3atPHw8Pj7778FQdi9e7erq2tQUJAInTtgwABLS8sTJ07IUtH48eOjoqJEKHf48OEGBgZeXl6y5L1///64uDgRyp08eXLNmjVlf1g6OjomJyffv39f5Enk4OBgY2MjwiSSSCTt2rUrnkRWVlbiTCKUSJF6kn6O+/fvL1iwQPrVHjx4sG7dun79+rm4uOzatSs9PV0KJZk+fXpQUJBSik5PTx80aNDHX1MEhbG3ty/+8RUVFSVOofn5+aampsXlZmRkiFPuuze6mZqa5ufni1Puu8nP3t5etM59d7nd2dlZtHJlKVAmMDBQtHKdnT9tIWEAACAASURBVJ2Lyw0KCirdk+hfd22KNonwSWVi+xg7O7uIiIi8vLxPvjIjI+POnTvF/339+vW5c+d8fHxGjhw5atSoI0eONG7cODAwcNeuXS4uLvw1oywnTpywsLBo3bq1UkqXSCS2trY3btygI5TC19e3OCiIsJJRvCi4cuVK2b+9vLxEm/sSiaQ4o4izHFi8KFicFYobXJxFweLA7ePjI1q5v/76a3HaHjBggGjlFn9Ge3v7Nm3alO5J9O5gFnMSgRXB/+vkyZO///77x18THR3dsGHDrl27HjlyZPLkyd26dRs8eLCvr29ISAgrcKrj4cOHw4cPV24d0tPThwwZwoqgchcFRVvJ+NeioMgrGbJ1FDGXA99dFBRzOfDdRUExlwPfXRQUcznw3UVBMZcDlTiJihcFWQ5UKRpKefCGXPLrF/ytuXv37g/9SX358uWBAwfKrplduXKlo6OjjY0NfyeomszMzCFDhmzfvt3Q0FC5NZk+ffrYsWOrV6/+n9+V7/OO8S9Xr17duHHjuzcWiGP37t2RkZHz5s0TuVxvb28rKysXFxeRy23YsKGvr6+YK1WCIBQUFFhaWl6/fl20lariny1WVlZxcXEiX3YcHR3du3dvca4OVIVJ5O3tLQiC+JMIH1GGguDt27dr1Kjxr6d9hIaGHj58ODY21sTEJCcn5/nz53FxcStWrFDWaUd8vNPd3d2nTJlSv359pVfm2bNnfn5+H3ruHEFQ0VJSUoyNjUUutKCgIDc3V/xTWpmZmeXLlxc5oMgyishpTLnlKmVQlbVyZTcOc16YIKicIPgvJ06c2LRpk4ODw9ChQ2vXrs1QUH3+/v5Vq1b94YcfVKQ+Q4cO9ff319HRIQgCANRUWXzW8F9//fXzzz8nJycfPXrU29ubFKgWUlJSQkJCVCcFCoLQrVs32RYbAAAQBNUjTLi5uV2/fj0gIGDEiBHin2rBF5sxY8aMGTNUqkq9evW6dOkSXQMAUF9lKAkdPnz48uXLXl5eZmZmdLx62bp1a5cuXczNzVWqVgYGBllZWfQOAEB9lYkVwdzc3NGjRycmJq5du5YUqHYSExOvXbsm/i2TJWFhYfHuQ6IAACAIqpb09PQBAwYMHDhwzJgx73598uTJr169YgSovvXr17+7779Kadeu3ZkzZ+gjAABBUBWlpaWNGTNm2bJlnTp1+te3Zs+ePXny5IiICAaBKouMjNTT01O1k8LFGjVq9M8//9BNAACCoMrJyckZNGjQvHnz6tWr9/53jY2Nf//9dx8fH673V2U+Pj7jxo1T2eppa2sXFhaq6R5MAACU5iDo5uY2bdq0unXrfugFenp627ZtO3HixL59+xgKKigkJKRatWrffPONKleybt26jx8/prMAAARBFeLv7//dd9+1a9fu4y/T0tJauXJlTEzM8uXLWddRNb6+vqq8HCjTvHnzW7du0VkAAIKgqnj69Om9e/fc3NxK+Prp06fb29u7ubnFxsYyJlREbGysoaFhlSpVVLyeTZo0uXv3Lv0FAFBHpXAfwaKiokmTJm3fvv2z3tWtW7fWrVtPnDjR2dnZ0dGRkaF0W7ZscXd3V/16Vq5c+fXr1/QXAEAdlcIVQX9//z59+hgZGX3uGw0NDf39/W/cuDFr1qy8vDwGh3JFRUVZWVnRDgAAEARL6uXLl6dPnx4xYsQXNoem5ty5c3/66acxY8bcuHGD8aEsd+/ebdWqlbrUtkKFCunp6fQaAEDtaKjpHRIfqvbUqVOdnZ0dHBy+8vhSqXTBggXly5efPn26pqYmA0VkycnJ+vr6BgYGalHb1NRUAwODdx9draGhQScCAFRfqYo4aWlpMTExX58CBUHQ1NT09PS0s7NzcXGJj49noIgpISFBW1tbXVKgIAgVK1a8f/9+ZGQkfQcAIAgqzb59+0aPHi3HA/bs2XPt2rXTp09n02lxSKXSTZs2hYaGrlmzZurUqWpR55SUlClTphgaGh45coTbhwEABEGluXnzptxv+K1atWpgYOC9e/d8fHzy8/MZMQp1/Pjx+Pj4rl27ent7nzx58ty5c6pf58GDB0+YMKFu3brVq1eXSCR0IgCAIKgEMTExCnoirYaGxuTJkzt27Ojq6pqYmMigURwrK6uKFSvK/l2hQoXU1FQVr3BUVFRUVFRubu6JEyeaNWv2kcfYAABAEFSg48eP//DDD4o7fqtWrdasWTNu3DieJ6Y4NjY206dPFwQhNjb2zZs33bt3V/0gmJubm5WV5eTktGzZMjYkBwAQBJXj1q1bcrlN5CPMzMwCAgIWLVrEbQGKtnLlyhMnTqj+/SJFRUWamppNmjQRBMHe3n7jxo30HQCAICi2jIwMiUQiwp4d+vr6vr6+S5cuZZdBxdmyZcvYsWPr1q2bkJCg4lWtVq2anp6e7N86OjqqX2EAAEphEAwKCmrbtq04ZUkkks2bN/v5+d2/f58BJHe+vr7W1tZFRUWXL19+9OiRite2Tp06FStWzMrKEgTh+fPnqn8uGwCAd5WSDaW9vLyGDBlSs2ZN0SqQl5c3evToDRs2qNF2d6rvn3/+GTduXHHnnjx50sTERMXrHBYWtnfvXisrq8TERNkFjgIbSgMACIJiBsHhw4dv27ZN5DrExMR4eXn5+flpaWkxkvD/m1cEQQCAOuDhaV+uevXqrq6uixcvpink7sKFC2pU24SEhPPnz9NrAACCoBJkZWXp6+srpejOnTsnJyezoYzcnT17Vo1qGxMT8+zZM3oNAEAQVILY2Nhq1aopq3RPT08WBeVOva5YSEpKqlq1Kr0GACAIKkF8fLyFhYWySjcyMmrQoAEPmZUvc3NzNVpje/78uZmZGb0GACAIKkFKSopy7y0dO3bsvn37GExy1KlTp2PHjqlLbaOjo2vVqkWvAQAIgkqQlpZWoUIFJVZAX18/Pz9fTe+/Vk22trbBwcFq9KeIkZERvQYAIAgqgRJvFinWqFGjq1evMp7kRUNDo0aNGk+fPqUpAAAgCH5MYWGhtra2cuvQunXrEydOMJ7kaNSoUVu2bFH9emZnZ+vq6tJfAACCoJI+g6amVCpVbh1q167NJjLyVaNGjcTERNnT21RZSEiInZ0d/QUAIAgqR7ly5XJzc+nL0mfo0KHiPzDmc925c8fBwYHOAgAQBJWjQYMGSr9GUBCE8uXLc7+IfHXq1OnGjRuZmZkqHgQbN25MZwEACIJKiwv169dXejX09fXfvHnDkJKvSZMm/fHHH6pcw7y8vHLlytFTAACCoBJIpdJNmzYdPHhw3bp12dnZymxKTc3CwkKGlHw5ODg8evQoLy9PNav3+PFja2trugkAQBBUjoULF1apUqVfv35dunTx9PRUYk2ys7O/+eYbhpTcubm5LVmyRDXrdunSpR9++IE+AgAQBJXj2LFj9vb2giA0aNDg6NGjSqxJZmamjo4OQ0ruGjVqlJGRERISooJ1e/z4sY2NDX0EACAIKodEIpGdkJVKpXFxcUq8XUNTU5PxpCBz585dsGCB0jcJ+peCggKlb2AJAECZDoKurq7//POPIAi3bt3S0NBQ1lV6aWlpFStWZDwpiKGh4dChQ3fs2KFStTp37lzLli3pHQAAQVBpRo8ebWpqeuXKFUNDw2+//VZZKzTBwcGtW7dmPCmOk5PTw4cPX7x4oTpVOnjw4Pfff0/XAAAIgkrzzz//VK9evX379vn5+Ur8rfzXX391796d8aRQs2fPnjJlioqcIH7+/HmFChX09PToFwAAQVBpLl26FBcXl52d7evrO2vWLGVV48WLF+bm5ownhapcufKgQYOWL1+uCpXZunXr8OHD6RQAAEFQmSZPniyVSs+fP79s2TJlRbGYmBhTU1MGkwicnJxyc3PPnTun3GpkZGQ8ffqURwwDANSdhpo+Fe39amdnZ2tpaSnlGQ+//fabs7Mz24iI1vVDhgxZsmSJEpdgV65c2bJlyzZt2nxwXmlo0FMAANVXenY8iYiI2Llzp/jl5ubm3rt3jxQo3t8uGhqrV69euHChsiqQm5sbHBz8kRQIAABBUGyNGzcOCwsTv9xdu3a5uLgwksRUpUqVjh07bt26VSml79mzx83NjV4AABAEVUu5cuVycnLELDEnJ+fIkSM///wzI0lkAwYMePToUVBQkMjl5uXlBQcHd+rUiS4AABAEVUvnzp2PHDkiZom+vr5ubm5aWlqMJPH5+Phs3Ljx+fPnYha6atWqIUOG0PgAAIKgyunQocPJkydFKy4zM/PixYu9evViGCmFlpbWmjVrpkyZItrjZGJiYp49e9a8eXMaHwBAEFQ52tra1apVe/LkiTjFbdmyZerUqYwhJapateovv/yydu1acYqbNGnSvHnzaHYAAEFQRY0dO3b9+vUiFPT69euQkJAOHTowhpSrY8eOOTk5N27cECH3//zzzxYWFrQ5AIAgqKLMzMx0dHSioqIUXdCcOXMmTZrEAFIFM2bMWLVqVUpKiuKKePbs2e3btwcOHEhrAwAIgipt0qRJq1atUmgRd+7cycvLa9iwIQNIFWhpaa1YsWLKlCkK2h09Jydn3LhxCxYsoKkBAARBVWdpaVm5cmXF7SmYn58/d+7cJUuWMHpUR7Vq1QYNGrR48WK5H7mgoGD06NHz5883MTGhnQEABEE1MGPGjM2bNyvo4H/88ceQIUOMjY0ZPSqlW7duBQUFcr9Y0N3dfdCgQdwpDAAgCKoNfX19Kyur69evy/3I2dnZFy9eZAdp1TR79mw/Pz+pVCqvAy5ZsqRdu3Zdu3albQEABEF14u7uvmLFiry8PPkedvHixe7u7owb1aStre3i4iKv28Z37NiRl5c3bNgwGhYAQBBUM+XLl589e/bs2bPleMz79+/HxsZ27tyZcaOyOnfuHBMT8+DBg685iFQq9fb2jouLY9dAAEDppqGgGy0VrYTV/v33301MTPr27fuVxf3999/VqlUbPXr0rl27uDpQxWVlZQ0dOnTfvn2amppf9vYRI0b079+/f//+Xz6vNDToCACA6tMs3R/P3d39zJkzSUlJX3mco0ePWllZSaXS8uXLM2hUnL6+vqur6759+77gvSkpKUOGDJkyZcrXpEAAAAiCqmLRokVTpkx59erV1xwkLi5OKpUGBwefPn2aQaP6+vTpExQU9FlXiBYVFe3YsWPKlCmrV6/mHmEAAEGwlDAyMlq2bNno0aPT0tK++CAJCQkNGza8c+fOgAEDGDRqYciQISW/a+TJkye9e/cuKirauXOnpaUlrQcAKCO0y8KHNDc3X7JkyciRI7dt22ZgYPC5b8/KyqpYseL//vc/iUTCiCm5Z8+ehYeHx8TEvHr1KjMzMysrSxAEiUSir69foUIFCwsLMzMzCwsLBQWvFi1arF+/PiMj4+M9npWVtXr16kePHvn5+VWtWpVeAwCUKaX8ZpF3PXnyxMfHx9fXV09P77PeuGLFiiZNmnTq1Inh8klPnz49ceLE1atXCwsLa9WqZW1tbWlpaWZmpqurW65cuaKiory8vLy8vMTExJSUlNjY2Pj4+Pj4eEEQ9PX17ezsGjVqZGtra2ZmJpfKhIaGVqhQoXr16v/53dzcXD8/v//973/jx4///vvv5TyvuFkEAEAQVKkgKIsp3t7e06ZNs7W1LeFb3r59O3z48EOHDinog+Tn5+fk5BQWFurq6urq6qrpMHr9+vW2bdvCwsKqV6/epUuXZs2a6ejofNYRsrOzHz16FBYWFh4enpiYKJVKDQwMrK2tbW1tbW1tv/nmm3+9PiYm5kMJ75MNfvny5VOnTmVmZv7000+Ojo4KmVcEQQAAQVDVgqAgCDk5OVOnTm3QoIGHh0dJXr9w4cI2bdp07Njx6+uclZUVGhp67969Bw8ePHr0KCYmJjExMSMjo/gFurq6ZmZmderUadasWfv27du2bVuuXDnVj4CLFy+Oi4ubOnVq06ZN5Xjk9PT0e/fu3b17Nzg4OCUlRSKRNG7cuHHjxjY2NtWrV69du3bXrl29vb1LuJtPamrqX3/9dfLkyeTk5O7duw8YMOD9cEkQBAAQBEt5EJTZu3fvpUuXli5d+vE0kJeX17dv35MnT35NTrp69erVq1cvX7589+7dgoKCd79rZGRkZGQkkUg0NTVzcnJevnyZkpJS/IQ0AwODH374YezYsa1atVLNXjh69OjOnTunTZvWokULRZeVlZV1586de/fuhYeHP3v27Pz581Kp1NDQcPz48U2aNJG1pJaWloaGhuwEdGpqakJCQlRUVFRUVG5ubsWKFdu2bfvdd9+JcyEgQRAAQBBU3SAoCEJcXNzq1auNjY1Hjx5tZGT0n6/Zs2ePIAjOzs6fdeSoqKigoKCbN28GBQU9ePBAVlUDA4NGjRrZ29vXr1+/fv36tWvXNjc3f//8aV5eXnR09N27d4OCgi5evBgRESEIQsuWLceNGzdgwAAtLS0Vaf9Xr14tXLiwcePGQ4YMEb/02NhYW1vbli1btm3btmnTplKpNDk5OTs7uzhDa2trGxsbV61a1cLCwsLC4nPPUxMEAQAEwVIeBGUeP368cuVKY2Pj8ePHv79WNGjQoB07dpQkfj179uzixYuylb/Y2FjZFw0NDTt27NiuXbu2bds2adJEW/uz79EOCQlZvnz5nj17ioqKbG1td+zY0ahRI6U3/p07dxYvXrx69WoLCwulVCAnJ0dDQ0OVN/cmCAIACIJqEARlwsPDN23alJ6e/sMPP/To0UN200ZKSsrSpUtXrFjxn29JSEh48ODB7du379y5c/PmTdmtr4IgaGlpNW/evGvXrh06dGjVqpVc1qJCQkKmTp164cIFPT29devWjRgxQoktf/36dT8/P19fXzW6tUUqlT5//lzMDQIJggAAgqDaBEGZ3NzcEydO2Nvb16lTRxCEffv2mZqatm/fXhCEnTt3Xrp0KTs7+/Xr1wkJCdHR0ZmZmcVv1NbWlu0v07Zt29atW1esWFERH3nnzp3jx49PT0/38PBYu3btlz1I9ys9evRo1apVmzZtUkrpXyY9Pd3GxqZly5b79+8nCAIAQBAskZkzZy5atEh2XnjEiBE7duwQBEFHR6dKlSrm5ubVqlWrU6eOtbW1jY1NgwYNxFkeCwsL+/nnn8PCwgYOHLhjx44vONf8NR4/fuzj47Np06bP3YhR6ezs7F68eJGcnCzaRZYEQQCAWtCmCT5EKpUW54bVq1cvX75cT09PX19fiVVq0KDB9evX+/btu3fvXkEQdu3aJVrgSE1NnTVrVkBAgNqlQEEQWrVq9ccff9y7d8/BwYGBDQBAMU2a4D/l5ua+ey9CxYoVjYyMlJsCZQwMDI4dO9a8efO9e/fOmzdPtHIXLVq0YsUKNX3Inr29vSAIwcHBDGwAAAiCn3b//v2aNWuqZt309PT27t1bqVKlxYsXHzt2TIQSr1y5YmlpqbIN8knW1taCIISGhjKwAQAgCH7agwcPVDn3VK9e/dChQzo6OiNGjIiJiVFoWW/evNmyZUsJH8SimurVqyfrUwY2AAAEwU+LjY2tVq2aKtfwu+++8/HxefPmzfTp0xVakKen5/z580W+MUW+zM3Ny5UrFxkZycAGAIAg+GlxcXFVqlRR8UpOnDixefPmBw4cuHHjhoKKuH//vqGhoWw/HfWloaFhbm6emJj4r0f8AQBAEMR/yM7OVtB2gPLsPE1NPz8/HR2dcePGFRYWKqKI5cuXz5w5sxR06LfffltUVJSSksLYBgCAIPgJCspVcmdrazt48OC7d+8GBATI/eAXLlzo2LGjoaFhKejQSpUqCYLw5s0bxjYAAATBT1CjfbYnTJggCMKSJUukUql8j3z8+PGhQ4eWjg6Vbf2TnZ3N2AYAgCD4CaI9guLr2dnZOTo6RkZGHj58WI6HffHiReXKldX6HpH3O5RrBAEAIAh+mp6eXnp6urrUds6cOYIgLF++XI7HXLdu3bBhw0pNh8rO9atRvgcAgCCoNJaWlmp0Y0G7du1atmx569at27dvy+WAaWlpr169UvENdD6L7KSwOj4fDwAAgqDYzM3N4+Pj1ajCbm5ugiAcOHBALkfbuXPnoEGDSlOHpqamCoKg+neCAwBAEFS+evXqRUdHq1GFf/75ZyMjo3379n39bS5FRUVBQUHt27cvTR2amJiooaFhYmLC2AYAgCD4CY0aNQoLC1OjCuvp6Q0aNCgmJuby5ctfeahLly516NChNPVmUVFRXFyciYlJuXLlGNsAABAEP6FixYqyk4lqxMXFRRCEXbt2feVx9u3bN3DgwNLUm0lJSbm5uar88GgAAAiCKtY0mmrWOE2bNjU1NT106FBeXt4XHyQzM7OoqKiUXUv39OlTQRDq16/PqAYAgCBYItbW1vK6CVc0vXv3TktLO378+Bcf4ejRo7KVxdLkwYMHgiA0atSIUQ0AAEGwRBwdHQ8dOqRedXZychIEITAw8IuPcOvWrVJ2gaAgCHfv3hUEoWXLloxqAAAIgiVSv379e/fuqVedO3TooKure+bMmczMzC94e0ZGhuxRbKVMcHCwnp4eK4IAABAEP0ObNm3++usvNaqwvr5+r169cnJyjh49+gVv37179w8//FDKOvHVq1chISEdO3bU0dFhSAMAQBAsKTc3Nz8/P/Wqs+yG3z179nzBey9dulT6zp8eP368sLBQdtIcAAAQBEvK2NhYW1s7Li5OjerctWtXiURy/vz5jIyMz3rjw4cPra2tS18nHj58WENDo/StdAIAQBBUuAkTJqxfv16NKqynp9ejR4+8vLyLFy9+1hsDAgKGDh1ayrrv9evXZ8+ebdKkiZmZGYMZAACC4Odp3Lhxenp6cnKyGtVZtv+LbBOZly9fluQtWVlZKSkp1atXL2Xdt3Xr1ry8vP79+zOSAQB4n8bXP5pWKcSsdlxc3B9//DF//nx1aZyCggJTU1OpVGphYeHg4LBt27aSBCZzc/Nu3bqVpsFdWFhYu3bt+Pj46OhoCwsLUeeVhgY/XAAAqo8VwU+ztLTMysoq4dKa0j169GjEiBFZWVlv3759+PChoaFhSd519uxZR0fHUtZxBw8ejIuL69Gjh8gpEAAAgmCpMnHixDlz5qhFVatVq/bq1avc3FzZf0sSBG/dutWmTRu1e6TexxUWFi5YsEAQhNmzZzOAAQAgCH45c3Pz5s2bf9meLCLT09M7dOhQ69atZf8tX778J9+yf//+UaNGlbIuO3jwYFhYmJOTEw8UAQCAIPi1Ro4ceeLEiYSEBNWvavny5Y8ePVqnTh1BEAoKCj7+4rdv32pra+vp6ZWy/lq+fLmGhoYaXdkJAABBUNWzxdSpU9Xi9prKlSvL7hH55OOSN23aJNuDujTZu3fvnTt3XFxcGjduzLgFAIAgKAdmZmZubm6rVq1Si9q2atWqadOm4eHhly5d+tBrXr58GRkZ2bBhw9LUTQkJCZMmTapUqdLy5csZtAAAEATlpkOHDkVFRefOnVOL2s6YMUMQhE2bNn3oBT4+PjNnzixlfTRy5MiUlJS5c+dWrVqVEQsAAEFQnqZMmRIQEBAWFqb6Ve3Tp0+tWrWOHTv2n0/Je/bsmYaGhpWVVWnqnV27dp05c8bW1tbDw4OxCgAAQVDeTaapuXnz5nnz5iUmJqp+VWfOnJmfn79kyZL3v7tx40Z12ROnhBITE6dOnVq+fPmAgAAdHR3GKgAABEH5k0gkfn5+c+fOVf1dpocOHVq3bl0/P7979+69+/XLly/Xrl27cuXKpaZT0tLSevXqlZKSsmXLllJ21SMAAARB1VKpUqVFixaNHj1axTeU0dbWnjNnTmFh4ejRo6VSqeyLr1+/9vX1/eWXX0pNd+Tl5fXt2/f27dvjxo0bNGgQ4xMAgJLgWcNfJTExcezYscuWLatdu7bKtlVhYaGDg0NoaOjvv/8u2zh6z549LVq0qFWrVukYxFKp1NXVdf/+/U2bNr1y5Yqurq7y5xXPGgYAEARLfRAUBCEtLW3WrFn9+vXr1KmTyjbXw4cPW7VqpaGhcevWrbp165amESyVSseMGePv79+0adNTp04ZGRmpxLwiCAIACIJlIQjKzJ8/38LCQrbe1rlz52+++aawsLBnz55ubm4qUkN/f393d/cWLVr8/fffWlpapWP45ufnDxs2bO/evc2bNz9z5kyFChUUVFBmZmZJntoMAABBsCwGQUEQtmzZYm1t3a5du8WLF5uZmTVq1EjVbllwdnbev3//pEmTVq5cWQrGblpa2oABA86dO9ekSZMLFy4oLgV+ybxiRRAAQBAsU0Gw2IEDB/r376+CFcvIyGjWrNnjx4/XrFkzfvx4tR640dHRTk5O4eHhjRo1On36tLGxsWrNK4IgAEAdcNew/D1+/Pjvv//es2fP7t27VaE+Uqn0+vXrgiAYGBgcOnTI2Nh48uTJCxcuVN8WPnjwYMuWLcPDw93c3P7++29VS4EAAKgLVgTlLz8/X7abcfPmzS9fvqyvr6/EyuTk5EyePPnHH390dHSUfSU0NLRDhw6pqanTp09fvHixevV7cnLy2LFjDx06JJFItm7dqporrwIrggAANcGKoJw9ePDg2LFjsn/r6OhERkYWFhYqqzL37993dXX18PAoToGCINjZ2Z07d65KlSrLli0bO3ZsQUGBurTtvn37bGxsDh06VLt27b/++ktlUyAAAATBMiosLCwvL0/27+zs7Jo1a545c2by5Mm3b98Wsxqpqanz588/efLkzp077ezs/vXdJk2a3Lhxw97efvPmza1atQoPD1eR1nv79u3NmzfHjRv39u3b4i8WFRX973//69ixo4uLS0FBwYIFC+7fv9+oUSMGGwAAX4lTw3JWUFCwbdu25s2bnzp1qkaNGs7OzoIg5Obmbty48fbt2z///LOTk5OmpgLzd2Zm5oYNG8LCwjw9PT++ZXRaWtrgwYNPnDih2KcHHgAAEcBJREFUp6e3bNmyMWPGKP2E5vPnz/Py8vr06XPhwoUqVaoIgnDx4sXffvvt5s2bgiAMHDhwzZo1anFFIKeGAQAEwbIYBAVBkEqlERER5ubmFStWfPfreXl5e/fuPX36tK2t7dChQ83NzeVb7ps3bzZv3hweHv7LL7+0bt26hO9au3btrFmzcnNzW7ZsuXr16ubNmyu9ARs2bFgcBK2trR8/ftyuXTsvL6/27durzbwiCAIACIJlMwh+UkhIyM6dOxMSEho2bNinT586dep8zdFycnJOnz598uRJLS0tNzc3BweHzz3CnTt3Bg8eHBERIQjC4MGDvby8qlevriJBcOTIkQMGDOjWrZuazSuCIACAIEgQ/LiwsLCLFy/GxMRoaGhUqlTJ1tbWysqqRo0aenp6H09+T58+ffjw4cOHD7OyssqXL9+mTZsOHTp8/F0fV1BQEBgYuGrVqgcPHmhpaXXv3n3gwIG9e/cW4ZbnwsLCu3fv3rp1a8yYMe8HQXWdVwRBAFCe6OjoGjVq/OuLmZmZgiBIJBLahyCoil69ehUcHBweHh4ZGZmVlfV+nij+yHp6evXq1WvSpEnjxo3lPqD37dvn7e0tWx00NDTs169fr169HB0d5ZsICwoK7t69e/369aCgoIsXL75580YikaSlpREE1e5HrbGxsbr8VI2OjrawsNDW1laL2oaGhr5/m5dqKigoiI+Pf/+XrmrKzMxMSUlRl9qq1xQLDQ21trZWkSnm6OiYnJx89OjRd/v66tWrbdu2DQwMHDBggLr8KBApUakjKRTp/PnzAwcO1NPT09DQ0NDQ0NHR6dy5s7e39+nTpxMTE7/ggGlpaTdv3vTz85s4cWL79u0NDAw0/h8DA4NevXr5+voWv9jOzi45OVmtG7CobMjPz7e3t/fy8srIyFD92iYnJ9vb2wcGBubn56t+bYOCguzt7YOCgtRiJKxfv97Z2TkqKkotatulSxd1qW1+fr6pqam6TLGoqChTU1PVmWInT540NTV1dnZ+t/WioqKcnZ1NTU3VZXKJgBVBfFBqauqZM2cuXbp07dq1sLCw4jY3MjKysLCoXr26qalp5cqVJRKJrq6ubA9tqVSak5OTnZ2dmpqampqalJSUkJDw/Pnz169fFx+2XLlyNjY2Dg4OjRo1cnBwaNy4sey9giDExsbevHlz4sSJ8+bN69SpU926dVkRVHEpKSkmJiaCIHh5ef36668qvnQhWw8wNTVduXKl6i8JeHt7e3p62tvb+/r6tmnTRsVHgqOj4/nz552dnX18fFR8vS0zM9PKyioxMVEtahsdHV2zZk11mWK7d+92dXVVnSlWUFDg4+Pj6em5fv36X375pbg+V69e9fDwsLGxUf0BIMYvLIIgSuLly5fXrl27ffv2vXv3wsPDo6OjS7hRtpGRUfXq1WvUqGFtbW1jY2NnZ1e3bt0P/XSQSqWFhYXa2trqHqRUs/4FBQXFmVtBvLy85s2bpxZtKPtd5eLiohYNa29vv2vXLrmcLM7MzDQwMFBobZ2dndeuXSuXnZ5EmErOzs5+fn5yCVgi1FZeU0yEQWtqavrHH3/06NFDxQetHH9qqSnOkaNEqlSp0qtXr169ehUH8ZSUlKSkpJcvX6alpeXk5OTm5mpoaGhpaenq6hoYGFSqVMnIyOjbb7/9rFtYNDU1FbrJYhmnra2tiL+gXFxc9uzZI/uFOmTIEFX+Y6+goMDBwSEkJEQQhDFjxvTu3VuVG7Z4tdXU1HTGjBnW1tZyOaxEIlFEbWWrrbLMOnbsWHnt96mgv/llq62yQevj4yOvZTYF1Va22irfKaagQVu82iqbYvLa8+trBm1BQcHmzZvHjx//n4uCJiYmcvyppa64RhDgGsEvFhgYKPv9pBZXXE2YMEG2AKD6V1zJrr9UqSuuPn79pampqbpc1BgUFKRGg3b9+vVqVNsuXbqo1BQrvkwwOTn53eHKZYLvYkUQwBeKjo4+ceJEVFSUWlxkc+rUKSMjo4yMDLW4B9PHx2fGjBlqcW9jQUHBwoULDxw4oPoXMsqWrPbv368ugzY0NPTatWvqUtsNGza0a9fuyJEjqjDFoqOjZUv+Z8+eLb6moviSwcDAwICAAG4cluEaQUAB84p9BAFAeVxcXJycnP51EfDVq1f3798vx4sBCIIEQYAgCABQY1yYDwAAUEZpsLQGAABQNrEiCAAAQBAEAAAAQRAAAAAEQQAAABAEAQAAQBAEAAAAQRAAAAAEQQAAABAEAQAAQBAEAAAAQRAAAAAEQQAAABAEAQAAQBAEAAAAQRAAAAAEQQAAABAEAQAAQBAEAAAAQRAAAAAEQQAAABAEAQAAQBAEAAAAQRAAAAAEQQAAAIIgAAAACIIAAAAgCAIAAIAgCAAAAIIgAAAACIIAAAAgCAIAAIAgCAAAAIIgAAAACIIAAAAgCAIAAIAgCAAAAIIgAAAACIIAAAAgCAIAAIAgCAAAAIIgAAAACIIAAAAgCAIAAIAgCAAAAIIgAAAACIIAAAAgCAIAABAEaQIAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAAAQBAEAAEAQBAAAAEEQAAAABEEAAAAQBAEAAEAQBAAAAEEQAAAABEEAAAAQBAEAAEAQBAAAAEEQAAAABEEAAAAQBAEAAEAQBAAAAEEQAAAABEEAAAAQBAEAAEAQBAAAAEEQAAAABEEAAAAQBAEAAEAQBAAAAEEQAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAACAIAgAAACCIAAAAAiCAAAAIAgCAAAQBAEAAEAQBAAAAEEQ+D/t1qENAEAMw0DyMPtvWpxOUenB3QhGBgCMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQCMoAQAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBAIygBAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBAAwggAAGEEAAIwgAABGEAAAIwgAgBEEAMAIAgBgBAEAMIIAABhBAACMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQCMIAAARhAAACMIAIARBADACAIAYAQBADCCAAAYQQAAjCAAAEYQAAAjCACAEQQAwAgCAGAEAQAwggAAXHgzk0QI+EpbEQC4tv92ipGIjZDrAAAAAElFTkSuQmCC)
9
3
(K9a
38
)
A knot diagram
1
Linearized knot diagam
6 8 7 9 1 2 3 4 5
Solving Sequence
1,5
6 2 7 9 4 3 8
c
5
c
1
c
6
c
9
c
4
c
3
c
8
c
2
, c
7
Ideals for irreducible components
2
of X
par
I
u
1
= hu
9
− u
8
− 6u
7
+ 5u
6
+ 11u
5
− 7u
4
− 6u
3
+ 4u
2
− u − 1i
* 1 irreducible components of dim
C
= 0, with total 9 representations.
1
The image of knot diagram is generated by the software “Draw programme” developed by An-
drew Bartholomew(http://www.layer8.co.uk/maths/draw/index.htm#Running-draw), where we modi-
fied some parts for our purpose(https://github.com/CATsTAILs/LinksPainter).
2
All coefficients of polynomials are rational numbers. But the coefficients are sometimes approximated
in decimal forms when there is not enough margin.
1