Remove matplotlib margin with plt.axis or mpl.rcParams config (reference: https://stackoverflow.com/a/45667625 )

plot.ipynb

{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x11883fa58>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x1159bf198>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "plt.plot([1,2,3,4])\n",
    "plt.show()\n",
    "\n",
    "plt.plot([1,2,3,4])\n",
    "plt.axis([0,3,1,4])\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<matplotlib.figure.Figure at 0x1189b1e10>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "import matplotlib as mpl\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "mpl.rcParams['axes.autolimit_mode'] = 'round_numbers'\n",
    "mpl.rcParams['axes.xmargin'] = 0\n",
    "mpl.rcParams['axes.ymargin'] = 0\n",
    "\n",
    "plt.plot([1,2,3,4])\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": []
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python [conda env:dl-gpu]",
   "language": "python",
   "name": "conda-env-dl-gpu-py"
  },
  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.5.0"
  },
  "widgets": {
   "state": {},
   "version": "1.1.2"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}