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python机器学习理论与实战 python机器学习理论与实战(二)决策树

marvin521 人气:0
想了解python机器学习理论与实战(二)决策树的相关内容吗,marvin521在本文为您仔细讲解python机器学习理论与实战的相关知识和一些Code实例,欢迎阅读和指正,我们先划重点:python,机器学习,决策树,下面大家一起来学习吧。

        决策树也是有监督机器学习方法。 电影《无耻混蛋》里有一幕游戏,在德军小酒馆里有几个人在玩20问题游戏,游戏规则是一个设迷者在纸牌中抽出一个目标(可以是人,也可以是物),而猜谜者可以提问题,设迷者只能回答是或者不是,在几个问题(最多二十个问题)之后,猜谜者通过逐步缩小范围就准确的找到了答案。这就类似于决策树的工作原理。(图一)是一个判断邮件类别的工作方式,可以看出判别方法很简单,基本都是阈值判断,关键是如何构建决策树,也就是如何训练一个决策树。

(图一)

构建决策树的伪代码如下:

Check if every item in the dataset is in the same class:
    If so return the class label
    Else 
      find the best feature to split the data
       split the dataset 
       create a branch node
       for each split
          call create Branch and add the result to the branch node

      return branch node

         原则只有一个,尽量使得每个节点的样本标签尽可能少,注意上面伪代码中一句说:find the best feature to split the data,那么如何find thebest feature?一般有个准则就是尽量使得分支之后节点的类别纯一些,也就是分的准确一些。如(图二)中所示,从海洋中捞取的5个动物,我们要判断他们是否是鱼,先用哪个特征?

(图二)

         为了提高识别精度,我们是先用“离开陆地能否存活”还是“是否有蹼”来判断?我们必须要有一个衡量准则,常用的有信息论、基尼纯度等,这里使用前者。我们的目标就是选择使得分割后数据集的标签信息增益最大的那个特征,信息增益就是原始数据集标签基熵减去分割后的数据集标签熵,换句话说,信息增益大就是熵变小,使得数据集更有序。熵的计算如(公式一)所示:

有了指导原则,那就进入代码实战阶段,先来看看熵的计算代码:

def calcShannonEnt(dataSet): 
  numEntries = len(dataSet) 
  labelCounts = {} 
  for featVec in dataSet: #the the number of unique elements and their occurance 
    currentLabel = featVec[-1] 
    if currentLabel not in labelCounts.keys(): labelCounts[currentLabel] = 0 
    labelCounts[currentLabel] += 1 #收集所有类别的数目,创建字典 
  shannonEnt = 0.0 
  for key in labelCounts: 
    prob = float(labelCounts[key])/numEntries 
    shannonEnt -= prob * log(prob,2) #log base 2 计算熵 
  return shannonEnt 

有了熵的计算代码,接下来看依照信息增益变大的原则选择特征的代码:

def splitDataSet(dataSet, axis, value): 
  retDataSet = [] 
  for featVec in dataSet: 
    if featVec[axis] == value: 
      reducedFeatVec = featVec[:axis]   #chop out axis used for splitting 
      reducedFeatVec.extend(featVec[axis+1:]) 
      retDataSet.append(reducedFeatVec) 
  return retDataSet 
   
def chooseBestFeatureToSplit(dataSet): 
  numFeatures = len(dataSet[0]) - 1   #the last column is used for the labels 
  baseEntropy = calcShannonEnt(dataSet) 
  bestInfoGain = 0.0; bestFeature = -1 
  for i in range(numFeatures):    #iterate over all the features 
    featList = [example[i] for example in dataSet]#create a list of all the examples of this feature 
    uniqueVals = set(featList)    #get a set of unique values 
    newEntropy = 0.0 
    for value in uniqueVals: 
      subDataSet = splitDataSet(dataSet, i, value) 
      prob = len(subDataSet)/float(len(dataSet)) 
      newEntropy += prob * calcShannonEnt(subDataSet)    
    infoGain = baseEntropy - newEntropy   #calculate the info gain; ie reduction in entropy 
    if (infoGain > bestInfoGain):    #compare this to the best gain so far  #选择信息增益最大的代码在此 
      bestInfoGain = infoGain     #if better than current best, set to best 
      bestFeature = i 
  return bestFeature           #returns an integer 

        从最后一个if可以看出,选择使得信息增益最大的特征作为分割特征,现在有了特征分割准则,继续进入一下个环节,如何构建决策树,其实就是依照最上面的伪代码写下去,采用递归的思想依次分割下去,直到执行完成就构建了决策树。代码如下:

def majorityCnt(classList): 
  classCount={} 
  for vote in classList: 
    if vote not in classCount.keys(): classCount[vote] = 0 
    classCount[vote] += 1 
  sortedClassCount = sorted(classCount.iteritems(), key=operator.itemgetter(1), reverse=True) 
  return sortedClassCount[0][0] 
 
def createTree(dataSet,labels): 
  classList = [example[-1] for example in dataSet] 
  if classList.count(classList[0]) == len(classList):  
    return classList[0]#stop splitting when all of the classes are equal 
  if len(dataSet[0]) == 1: #stop splitting when there are no more features in dataSet 
    return majorityCnt(classList) 
  bestFeat = chooseBestFeatureToSplit(dataSet) 
  bestFeatLabel = labels[bestFeat] 
  myTree = {bestFeatLabel:{}} 
  del(labels[bestFeat]) 
  featValues = [example[bestFeat] for example in dataSet] 
  uniqueVals = set(featValues) 
  for value in uniqueVals: 
    subLabels = labels[:]    #copy all of labels, so trees don't mess up existing labels 
    myTree[bestFeatLabel][value] = createTree(splitDataSet(dataSet, bestFeat, value),subLabels) 
  return myTree   

用图二的样本构建的决策树如(图三)所示:


(图三)

有了决策树,就可以用它做分类咯,分类代码如下:

def classify(inputTree,featLabels,testVec): 
  firstStr = inputTree.keys()[0] 
  secondDict = inputTree[firstStr] 
  featIndex = featLabels.index(firstStr) 
  key = testVec[featIndex] 
  valueOfFeat = secondDict[key] 
  if isinstance(valueOfFeat, dict):  
    classLabel = classify(valueOfFeat, featLabels, testVec) 
  else: classLabel = valueOfFeat 
  return classLabel 

最后给出序列化决策树(把决策树模型保存在硬盘上)的代码:

def storeTree(inputTree,filename): 
  import pickle 
  fw = open(filename,'w') 
  pickle.dump(inputTree,fw) 
  fw.close() 
   
def grabTree(filename): 
  import pickle 
  fr = open(filename) 
  return pickle.load(fr) 

优点:检测速度快

缺点:容易过拟合,可以采用修剪的方式来尽量避免

参考文献:machine learning in action

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