ctralie/Cantor.ipynb

## Cantor.ipynb
{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 1,
   "id": "17941713",
   "metadata": {},
   "outputs": [],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "id": "f57d5874",
   "metadata": {},
   "outputs": [],
   "source": [
    "def plot_cantor(a=0, b=1, depth=1, h=0.5, base=3, max_depth=6, color='C0'):\n",
    "    \"\"\"\n",
    "    Parameters\n",
    "    ----------\n",
    "    (a, b): (int, int)\n",
    "        Interval that's being chunked out\n",
    "    depth: int \n",
    "        Depth of recursion (how many bits in we are)\n",
    "    h: float\n",
    "        Height at which we're drawing the interval\n",
    "    base: int\n",
    "        Base of domain, should be >= 3\n",
    "    max_depth: int\n",
    "        Maximum level of recursion\n",
    "    color: string\n",
    "        Color with which to draw point\n",
    "    \"\"\"\n",
    "    assert(int(base) == base and base >= 3)\n",
    "    c = a + (b-a)/base\n",
    "    d = b - (b-a)/base\n",
    "    dh = 2**(-depth-1)\n",
    "    plt.plot([c, d], [h, h], c=color, linewidth=1)\n",
    "    if depth < max_depth:\n",
    "        plot_cantor(a, c, depth+1, h-dh, base, max_depth, color)\n",
    "        plot_cantor(d, b, depth+1, h+dh, base, max_depth, color)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "id": "4275a9dd",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "plot_cantor(max_depth=10)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "id": "356637b8",
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "plot_cantor(base=5, max_depth=10, color='C1')"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "id": "97088b67",
   "metadata": {},
   "outputs": [],
   "source": []
  }
 ],
 "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": "3.8.8"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 5
}
	{
	"cells": [
	{
	"cell_type": "code",
	"execution_count": 1,
	"id": "17941713",
	"metadata": {},
	"outputs": [],
	"source": [
	"import numpy as np\n",
	"import matplotlib.pyplot as plt"
	]
	},
	{
	"cell_type": "code",
	"execution_count": 2,
	"id": "f57d5874",
	"metadata": {},
	"outputs": [],
	"source": [
	"def plot_cantor(a=0, b=1, depth=1, h=0.5, base=3, max_depth=6, color='C0'):\n",
	" \"\"\"\n",
	" Parameters\n",
	" ----------\n",
	" (a, b): (int, int)\n",
	" Interval that's being chunked out\n",
	" depth: int \n",
	" Depth of recursion (how many bits in we are)\n",
	" h: float\n",
	" Height at which we're drawing the interval\n",
	" base: int\n",
	" Base of domain, should be >= 3\n",
	" max_depth: int\n",
	" Maximum level of recursion\n",
	" color: string\n",
	" Color with which to draw point\n",
	" \"\"\"\n",
	" assert(int(base) == base and base >= 3)\n",
	" c = a + (b-a)/base\n",
	" d = b - (b-a)/base\n",
	" dh = 2**(-depth-1)\n",
	" plt.plot([c, d], [h, h], c=color, linewidth=1)\n",
	" if depth < max_depth:\n",
	" plot_cantor(a, c, depth+1, h-dh, base, max_depth, color)\n",
	" plot_cantor(d, b, depth+1, h+dh, base, max_depth, color)"
	]
	},
	{
	"cell_type": "code",
	"execution_count": 3,
	"id": "4275a9dd",
	"metadata": {},
	"outputs": [
	{
	"data": {
	"image/png": "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\n",
	"text/plain": [
	"<Figure size 432x288 with 1 Axes>"
	]
	},
	"metadata": {
	"needs_background": "light"
	},
	"output_type": "display_data"
	}
	],
	"source": [
	"plot_cantor(max_depth=10)"
	]
	},
	{
	"cell_type": "code",
	"execution_count": 4,
	"id": "356637b8",
	"metadata": {},
	"outputs": [
	{
	"data": {
	"image/png": "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\n",
	"text/plain": [
	"<Figure size 432x288 with 1 Axes>"
	]
	},
	"metadata": {
	"needs_background": "light"
	},
	"output_type": "display_data"
	}
	],
	"source": [
	"plot_cantor(base=5, max_depth=10, color='C1')"
	]
	},
	{
	"cell_type": "code",
	"execution_count": null,
	"id": "97088b67",
	"metadata": {},
	"outputs": [],
	"source": []
	}
	],
	"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": "3.8.8"
	}
	},
	"nbformat": 4,
	"nbformat_minor": 5
	}