ID3决策树算法实现 基于ID3决策树算法的实现(Python版)
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实例如下:
# -*- coding:utf-8 -*-
from numpy import *
import numpy as np
import pandas as pd
from math import log
import operator
#计算数据集的香农熵
def calcShannonEnt(dataSet):
numEntries=len(dataSet)
labelCounts={}
#给所有可能分类创建字典
for featVec in dataSet:
currentLabel=featVec[-1]
if currentLabel not in labelCounts.keys():
labelCounts[currentLabel]=0
labelCounts[currentLabel]+=1
shannonEnt=0.0
#以2为底数计算香农熵
for key in labelCounts:
prob = float(labelCounts[key])/numEntries
shannonEnt-=prob*log(prob,2)
return shannonEnt
#对离散变量划分数据集,取出该特征取值为value的所有样本
def splitDataSet(dataSet,axis,value):
retDataSet=[]
for featVec in dataSet:
if featVec[axis]==value:
reducedFeatVec=featVec[:axis]
reducedFeatVec.extend(featVec[axis+1:])
retDataSet.append(reducedFeatVec)
return retDataSet
#对连续变量划分数据集,direction规定划分的方向,
#决定是划分出小于value的数据样本还是大于value的数据样本集
def splitContinuousDataSet(dataSet,axis,value,direction):
retDataSet=[]
for featVec in dataSet:
if direction==0:
if featVec[axis]>value:
reducedFeatVec=featVec[:axis]
reducedFeatVec.extend(featVec[axis+1:])
retDataSet.append(reducedFeatVec)
else:
if featVec[axis]<=value:
reducedFeatVec=featVec[:axis]
reducedFeatVec.extend(featVec[axis+1:])
retDataSet.append(reducedFeatVec)
return retDataSet
#选择最好的数据集划分方式
def chooseBestFeatureToSplit(dataSet,labels):
numFeatures=len(dataSet[0])-1
baseEntropy=calcShannonEnt(dataSet)
bestInfoGain=0.0
bestFeature=-1
bestSplitDict={}
for i in range(numFeatures):
featList=[example[i] for example in dataSet]
#对连续型特征进行处理
if type(featList[0]).__name__=='float' or type(featList[0]).__name__=='int':
#产生n-1个候选划分点
sortfeatList=sorted(featList)
splitList=[]
for j in range(len(sortfeatList)-1):
splitList.append((sortfeatList[j]+sortfeatList[j+1])/2.0)
bestSplitEntropy=10000
slen=len(splitList)
#求用第j个候选划分点划分时,得到的信息熵,并记录最佳划分点
for j in range(slen):
value=splitList[j]
newEntropy=0.0
subDataSet0=splitContinuousDataSet(dataSet,i,value,0)
subDataSet1=splitContinuousDataSet(dataSet,i,value,1)
prob0=len(subDataSet0)/float(len(dataSet))
newEntropy+=prob0*calcShannonEnt(subDataSet0)
prob1=len(subDataSet1)/float(len(dataSet))
newEntropy+=prob1*calcShannonEnt(subDataSet1)
if newEntropy<bestSplitEntropy:
bestSplitEntropy=newEntropy
bestSplit=j
#用字典记录当前特征的最佳划分点
bestSplitDict[labels[i]]=splitList[bestSplit]
infoGain=baseEntropy-bestSplitEntropy
#对离散型特征进行处理
else:
uniqueVals=set(featList)
newEntropy=0.0
#计算该特征下每种划分的信息熵
for value in uniqueVals:
subDataSet=splitDataSet(dataSet,i,value)
prob=len(subDataSet)/float(len(dataSet))
newEntropy+=prob*calcShannonEnt(subDataSet)
infoGain=baseEntropy-newEntropy
if infoGain>bestInfoGain:
bestInfoGain=infoGain
bestFeature=i
#若当前节点的最佳划分特征为连续特征,则将其以之前记录的划分点为界进行二值化处理
#即是否小于等于bestSplitValue
if type(dataSet[0][bestFeature]).__name__=='float' or type(dataSet[0][bestFeature]).__name__=='int':
bestSplitValue=bestSplitDict[labels[bestFeature]]
labels[bestFeature]=labels[bestFeature]+'<='+str(bestSplitValue)
for i in range(shape(dataSet)[0]):
if dataSet[i][bestFeature]<=bestSplitValue:
dataSet[i][bestFeature]=1
else:
dataSet[i][bestFeature]=0
return bestFeature
#特征若已经划分完,节点下的样本还没有统一取值,则需要进行投票
def majorityCnt(classList):
classCount={}
for vote in classList:
if vote not in classCount.keys():
classCount[vote]=0
classCount[vote]+=1
return max(classCount)
#主程序,递归产生决策树
def createTree(dataSet,labels,data_full,labels_full):
classList=[example[-1] for example in dataSet]
if classList.count(classList[0])==len(classList):
return classList[0]
if len(dataSet[0])==1:
return majorityCnt(classList)
bestFeat=chooseBestFeatureToSplit(dataSet,labels)
bestFeatLabel=labels[bestFeat]
myTree={bestFeatLabel:{}}
featValues=[example[bestFeat] for example in dataSet]
uniqueVals=set(featValues)
if type(dataSet[0][bestFeat]).__name__=='str':
currentlabel=labels_full.index(labels[bestFeat])
featValuesFull=[example[currentlabel] for example in data_full]
uniqueValsFull=set(featValuesFull)
del(labels[bestFeat])
#针对bestFeat的每个取值,划分出一个子树。
for value in uniqueVals:
subLabels=labels[:]
if type(dataSet[0][bestFeat]).__name__=='str':
uniqueValsFull.remove(value)
myTree[bestFeatLabel][value]=createTree(splitDataSet\
(dataSet,bestFeat,value),subLabels,data_full,labels_full)
if type(dataSet[0][bestFeat]).__name__=='str':
for value in uniqueValsFull:
myTree[bestFeatLabel][value]=majorityCnt(classList)
return myTree
import matplotlib.pyplot as plt
decisionNode=dict(boxstyle="sawtooth",fc="0.8")
leafNode=dict(boxstyle="round4",fc="0.8")
arrow_args=dict(arrowstyle="<-")
#计算树的叶子节点数量
def getNumLeafs(myTree):
numLeafs=0
firstSides = list(myTree.keys())
firstStr=firstSides[0]
secondDict=myTree[firstStr]
for key in secondDict.keys():
if type(secondDict[key]).__name__=='dict':
numLeafs+=getNumLeafs(secondDict[key])
else: numLeafs+=1
return numLeafs
#计算树的最大深度
def getTreeDepth(myTree):
maxDepth=0
firstSides = list(myTree.keys())
firstStr=firstSides[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
#画节点
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)
#画箭头上的文字
def plotMidText(cntrPt,parentPt,txtString):
lens=len(txtString)
xMid=(parentPt[0]+cntrPt[0])/2.0-lens*0.002
yMid=(parentPt[1]+cntrPt[1])/2.0
createPlot.ax1.text(xMid,yMid,txtString)
def plotTree(myTree,parentPt,nodeTxt):
numLeafs=getNumLeafs(myTree)
depth=getTreeDepth(myTree)
firstSides = list(myTree.keys())
firstStr=firstSides[0]
cntrPt=(plotTree.x0ff+(1.0+float(numLeafs))/2.0/plotTree.totalW,plotTree.y0ff)
plotMidText(cntrPt,parentPt,nodeTxt)
plotNode(firstStr,cntrPt,parentPt,decisionNode)
secondDict=myTree[firstStr]
plotTree.y0ff=plotTree.y0ff-1.0/plotTree.totalD
for key in secondDict.keys():
if type(secondDict[key]).__name__=='dict':
plotTree(secondDict[key],cntrPt,str(key))
else:
plotTree.x0ff=plotTree.x0ff+1.0/plotTree.totalW
plotNode(secondDict[key],(plotTree.x0ff,plotTree.y0ff),cntrPt,leafNode)
plotMidText((plotTree.x0ff,plotTree.y0ff),cntrPt,str(key))
plotTree.y0ff=plotTree.y0ff+1.0/plotTree.totalD
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.x0ff=-0.5/plotTree.totalW
plotTree.y0ff=1.0
plotTree(inTree,(0.5,1.0),'')
plt.show()
df=pd.read_csv('watermelon_4_3.csv')
data=df.values[:,1:].tolist()
data_full=data[:]
labels=df.columns.values[1:-1].tolist()
labels_full=labels[:]
myTree=createTree(data,labels,data_full,labels_full)
print(myTree)
createPlot(myTree)
最终结果如下:
{'texture': {'blur': 0, 'little_blur': {'touch': {'soft_stick': 1, 'hard_smooth': 0}}, 'distinct': {'density<=0.38149999999999995': {0: 1, 1: 0}}}}
得到的决策树如下:
参考资料:
《机器学习实战》
《机器学习》周志华著
以上这篇基于ID3决策树算法的实现(Python版)就是小编分享给大家的全部内容了,希望能给大家一个参考,也希望大家多多支持。
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