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决策树算法实现

时间:2017-12-07 20:58:27      阅读:180      评论:0      收藏:0      [点我收藏+]

标签:range   text   mat   dep   enter   test   uniq   his   info   

from math import log
import numpy as np
from  operator import itemgetter


# 计算信息熵
def calcShannonEnt(dataSet):
    # 数据集中总的记录个数
    numEntires = len(dataSet)
    # 每种类型的个数
    labelCounts = {}
    for featVec in dataSet:
        # 当前的标签类别
        currentLabel = featVec[-1]
        # 统计每种类型个数
        labelCounts[currentLabel] = labelCounts.get(currentLabel, 0) + 1
    shannonEnt = 0.0
    for key in labelCounts:
        prob = float(labelCounts[key]) / numEntires
        shannonEnt -= prob * log(prob, 2)
    return shannonEnt


# 按照给定的特征划分数据集
# dataSet待划分的数据集  axis划分数据集的特征  value特征的返回值
def splitDataSet(dataSet, axis, value):
    reDataSet = []
    for featVec in dataSet:
        if featVec[axis] == value:
            reduceFeatVec = featVec[:axis]
            reduceFeatVec.extend(featVec[axis + 1:])
            # 去掉了划分数据特征即索引为axis的特征值
            reDataSet.append(reduceFeatVec)
    return reDataSet


def createDataSet():
    dataSet = [[1, 1, yes], [1, 1, yes], [1, 0, no], [0, 1, no], [0, 1, no]]
    labels = [no surfacing, flippers]
    return dataSet, labels


def chooseBestFeatureToSplit(dataSet):
    # 属性的个数
    numFeatures = len(dataSet[0]) - 1
    # 信息熵
    baseEntropy = calcShannonEnt(dataSet)
    # 默认最好的信息增益
    bestInfoGain = 0.0
    # 选中的划分属性index
    bestFeature = -1
    for i in range(numFeatures):
        # 获取某个属性的所有取值
        featList = [example[i] for example in dataSet]
        # 某属性可能的取值个数
        uniqueVals = set(featList)
        newEntropy = 0.0
        # 遍历某个特征的所有特征值
        for value in uniqueVals:
            # 分割数据集 把相应特征对应的特征值数据找出来
            subDataSet = splitDataSet(dataSet, i, value)
            prob = len(subDataSet) / float(len(dataSet))
            # 计算信息增益
            newEntropy += prob * calcShannonEnt(subDataSet)
        infoGain = baseEntropy - newEntropy
        if (infoGain > bestInfoGain):
            bestInfoGain = infoGain
            bestFeature = i
    return bestFeature


# 多数表决函数
def majorityCnt(classList):
    classCount = {}
    for vote in classList:
        classCount[vote] = classCount.get(vote, 0) + 1
    sorted_classCount = sorted(classCount.items(), key=itemgetter(1), reverse=True)
    return sorted_classCount[0][0]


def createTree(dataSet, labels):
    classList = [example[-1] for example in dataSet]
    # count返回在列表中出现的次数
    if classList.count(classList[0]) == len(classList):
        return classList[0]
    if len(dataSet[0]) == 1:
        return majorityCnt(classList)
    # 获得信息增益最大的索引
    bestFeat = chooseBestFeatureToSplit(dataSet)
    # 获取相应的标签
    bestFeatLabels = labels[bestFeat]
    myTree = {bestFeatLabels: {}}
    del (labels[bestFeat])
    featValues = [example[bestFeat] for example in dataSet]
    uniqueVals = set(featValues)
    for value in uniqueVals:
        subLabels = labels[:]
        myTree[bestFeatLabels][value] = createTree(splitDataSet(dataSet, bestFeat, value), subLabels)
    return myTree


# 决策树的分类函数  类似于搜索操作
# inputTree待查找的树
# featLabels标签集合
# testVec 需要分类的集合数据
def classify(inputTree, featLabels, testVec):
    # {‘no surfacing‘: {0: ‘no‘, 1: {‘flippers‘: {0: ‘no‘, 1: ‘yes‘}}}}
    # 属性特征
    firstStr = list(inputTree.keys())[0]
    # 对应特征的分类值
    secondDict = inputTree[firstStr]
    # 标签字符串所在的索引(即firstStr在featLabels上的位置序号)
    featIndex = featLabels.index(firstStr)
    # 对于特征属性每一个可能的取值
    for key in secondDict.keys():
        # 沿着决策树查找数据,如果key值匹配需要分类的集合数据
        if testVec[featIndex] == key:
            # 如果相应的值是dict字典 继续向下搜索
            if type(secondDict[key]).__name__ == dict:
                classLabel = classify(secondDict[key], featLabels, testVec)
            # 否则直接得出数据类别
            else:
                classLabel = secondDict[key]
    return classLabel


import pickle


# 写入决策树到文件
def storeTree(inputTree, filename):
    fw = open(filename, wb+)
    pickle.dump(inputTree, fw)
    fw.close()


# 加载文件内容
def grabTree(filename):
    fr = open(filename, rb)
    return pickle.load(fr)


myDat, lables = createDataSet()
updatlabels = lables[:]
print(lables)
myTree = createTree(myDat, lables)
print(myTree)
storeTree(myTree, "classfier.txt")
ff = grabTree("classfier.txt")
print("ff%s" % ff)



# print(classify(myTree, updatlabels, [1, 0]))
# print(classify(myTree, updatlabels, [1, 1]))

# print(classify(myDat, lables, [1, 0]))
# print(classify(myDat, lables, [1, 1]))
# print(splitDataSet(myDat, 0, 1))
# print(splitDataSet(myDat, 0, 0))
# print(createTree(myDat, lables))
# {‘no surfacing‘: {0: ‘no‘, 1: {‘flippers‘: {0: ‘no‘, 1: ‘yes‘}}}}

 

决策树图像算法

import matplotlib.pyplot as plt
# import decisions.createTree

# 定义判断节点形态
decisionNode = dict(boxstyle="sawtooth", fc="0.8")
# 定义叶节点形态
leafNode = dict(boxstyle="round4", fc="0.8")
# 定义箭头
arrow_args = dict(arrowstyle="<-")


# 绘制带箭头的注释
# centerPt节点的中心位置
# parentPt节点的起始位置
def plotNode(nodeTxt, centerPt, parentPt, nodeType):
    createPlot.ax1.annotate(nodeTxt, xy=parentPt, xycoords=axes fraction, xytext=centerPt,
                            textcoords=axes fraction, va="center"
                            , ha="center", bbox=nodeType, arrowprops=arrow_args)


def createPlot(inTree):
    fig = plt.figure(1, facecolor=white)
    fig.clf()
    axprops = dict(xticks=[], yticks=[])
    createPlot.ax1 = plt.subplot(111, frameon=False, **axprops)
    plotTree.totalW = float(getNumLeafs(inTree))
    plotTree.totalD = float(getTreeDepth(inTree))
    plotTree.xOff = -0.5 / plotTree.totalW
    plotTree.yOff = 1.0
    plotTree(inTree, (0.5, 1.0), ‘‘)
    plt.show()


# fig = plt.figure(1, facecolor=‘white‘)
# fig.clf()
# createPlot.ax1 = plt.subplot(111, frameon=False)
# plotNode(‘a decision node‘, (0.5, 0.1), (0.1, 0.5), decisionNode)
# plotNode(‘a leaf node‘, (0.8, 0.1), (0.3, 0.8), leafNode)
# plt.show()



# 获取叶节点个数
def getNumLeafs(myTree):
    numLeafs = 0
    firstStr = list(myTree.keys())[0]
    secondDict = myTree[firstStr]
    for key in secondDict.keys():
        if type(secondDict[key]).__name__ == dict:
            numLeafs += getNumLeafs(secondDict[key])
        else:
            numLeafs += 1
    return numLeafs

# 获取树的层数
def getTreeDepth(myTree):
    maxDepth = 0
    firstStr = list(myTree.keys())[0]
    secondDict = myTree[firstStr]
    for key in secondDict.keys():
        if type(secondDict[key]).__name__ == dict:
            thisDepth = 1 + getTreeDepth(secondDict[key])
        else:
            thisDepth = 1
        if thisDepth > maxDepth:
            maxDepth = thisDepth
    return maxDepth


def plotMidText(cntrPt, parentPt, txtString):
    xMid = (parentPt[0] - cntrPt[0]) / 2.0 + cntrPt[0]
    yMid = (parentPt[1] - cntrPt[1]) / 2.0 + cntrPt[1]
    createPlot.ax1.text(xMid, yMid, txtString)


def plotTree(myTree, parentPt, nodeTxt):
    numLeafs = getNumLeafs(myTree)
    depth = getTreeDepth(myTree)
    firstStr = list(myTree.keys())[0]
    cntrPt = (plotTree.xOff + (1.0 + float(numLeafs)) / 2.0 / plotTree.totalW, plotTree.yOff)
    plotMidText(cntrPt, parentPt, nodeTxt)
    plotNode(firstStr, cntrPt, parentPt, decisionNode)
    secondDict = myTree[firstStr]
    plotTree.yOff = plotTree.yOff - 1.0 / plotTree.totalD
    for key in secondDict.keys():
        if type(secondDict[key]).__name__ == dict:
            plotTree(secondDict[key], cntrPt, str(key))
        else:
            plotTree.xOff = plotTree.xOff + 1.0 / plotTree.totalW
            plotNode(secondDict[key], (plotTree.xOff, plotTree.yOff), cntrPt, leafNode)
            plotMidText((plotTree.xOff, plotTree.yOff), cntrPt, str(key))
    plotTree.yOff = plotTree.yOff + 1.0 / plotTree.totalD

myTree = {no surfacing: {0: no, 1: {flippers: {0: no, 1: yes}}, 3: maybe}}
print(the tree depth is %s % getTreeDepth(myTree))
print(the number of leaf are %s % getNumLeafs(myTree))
createPlot(myTree)
# createPlot()

 

决策树算法实现

标签:range   text   mat   dep   enter   test   uniq   his   info   

原文地址:http://www.cnblogs.com/09120912zhang/p/8000586.html

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