{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Figure 1 in IPFS Whitepaper \n",
    "[IPFSのWhitepaper](https://ipfs.io/ipfs/QmR7GSQM93Cx5eAg6a6yRzNde1FQv7uL6X1o4k7zrJa3LX/ipfs.draft3.pdf)中のBitSwapプロトコルの送信確率の負債依存性を描いているFigure1が何故か正しく描画されていない。\n",
    "\n",
    "なので自分で描いてみた、というただそれだけの物。"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 18,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "Text(0,0.5,'$P(send | r)$')"
      ]
     },
     "execution_count": 18,
     "metadata": {},
     "output_type": "execute_result"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "r = np.linspace(0, 4, 100);\n",
    "p = 1 - 1 / (1 + np.exp(6-3 * r))\n",
    "\n",
    "plt.title('Figure 1', fontsize=20)\n",
    "plt.plot(r, p)\n",
    "plt.xlabel('$r$', fontsize=15)\n",
    "plt.ylabel('$P(send | r)$', fontsize=15)"
   ]
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3",
   "language": "python",
   "name": "python3"
  },
  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.6.5"
  }
 },
 "nbformat": 4,
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