dhirschfeld/Test KDE Weights.ipynb

## Test KDE Weights.ipynb
{
 "metadata": {
  "name": "Test KDE Weights"
 },
 "nbformat": 3,
 "nbformat_minor": 0,
 "worksheets": [
  {
   "cells": [
    {
     "cell_type": "code",
     "collapsed": false,
     "input": [
      "from statsmodels.nonparametric.kde import KDEUnivariate"
     ],
     "language": "python",
     "metadata": {},
     "outputs": [],
     "prompt_number": 5
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": [
      "bimodal = np.concatenate([10+randn(100), 30+randn(100)])"
     ],
     "language": "python",
     "metadata": {},
     "outputs": [],
     "prompt_number": 10
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": [
      "kde = KDEUnivariate(bimodal)"
     ],
     "language": "python",
     "metadata": {},
     "outputs": [],
     "prompt_number": 11
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": [
      "x = np.linspace(0, 40, 256)\n",
      "kde.fit()\n",
      "plot(x, kde.evaluate(x));"
     ],
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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UoqKimvsaXGrdOpqB52XzTjFH3Pz4HBoqOxp14dm1ruPlBTz8MJCaCkyfLjsa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\nRK5CYII=\n",
       "text": [
        "<matplotlib.figure.Figure at 0xd9c70f0>"
       ]
      }
     ],
     "prompt_number": 14
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": [
      "w1 = np.concatenate([ones(100), zeros(100)])\n",
      "kde.fit(weights=w1, fft=False)\n",
      "plot(x, kde.evaluate(x));"
     ],
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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UoqKimvsaXGrdOpqB52XzTjFH3Pz4HBoqOxp14dm1ruPlBTz8MJCaCkyfLjsa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\nRK5CYII=\n",
       "text": [
        "<matplotlib.figure.Figure at 0xdc83ed0>"
       ]
      }
     ],
     "prompt_number": 16
    },
    {
     "cell_type": "markdown",
     "metadata": {},
     "source": [
      "Since the weights are zero for the 2nd 100 samples shouldn't the KDE be unimodal and centered at 10?"
     ]
    },
    {
     "cell_type": "code",
     "collapsed": false,
     "input": [
      "w2 = np.concatenate([zeros(100), ones(100)])\n",
      "kde.fit(weights=w2, fft=False)\n",
      "plot(x, kde.evaluate(x));"
     ],
     "language": "python",
     "metadata": {},
     "outputs": [
      {
       "metadata": {},
       "output_type": "display_data",
       "png": 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5JtX1P/igeSPJGqOoks758/QCU1Joe8KRI2VFxhhjylBQQKN3vLxo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\nRK5CYII=\n",
       "text": [
        "<matplotlib.figure.Figure at 0xdc7ac90>"
       ]
      }
     ],
     "prompt_number": 17
    },
    {
     "cell_type": "markdown",
     "metadata": {},
     "source": [
      "Since the weights are zero for the 1st 100 samples shouldn't the KDE be unimodal and centered at 30?"
     ]
    }
   ],
   "metadata": {}
  }
 ]
}