python实现高效的遗传算法
遗传算法属于一种优化算法。
如果你有一个待优化函数,可以考虑次算法。假设你有一个变量x,通过某个函数可以求出对应的y,那么你通过预设的x可求出y_pred,y_pred差距与你需要的y当然越接近越好,这就需要引入适应度(fitness)的概念。假设
fitness = 1/(1+ads(y_pred - y)),那么误差越小,适应度越大,即该个体越易于存活。
设计该算法的思路如下:
(1)初始化种群,即在我需要的区间如[-100,100]内random一堆初始个体[x1,x2,x3...],这些个体是10进制形式的,为了后面的交叉与变异我们不妨将其转化为二进制形式。那么现在的问题是二进制取多少位合适呢?即编码(code)的长度是多少呢?
这就涉及一些信号方面的知识,比如两位的二进制表示的最大值是3(11),可以将区间化为4分,那么每一份区间range长度range/4,我们只需要让range/n小于我们定义的精度即可。n是二进制需要表示的最大,可以反解出二进制位数 。
(2)我们需要编写编码与解码函数。即code:将x1,x2...化为二进制,decode:在交叉变异后重新得到十进制数,用于计算fitness。
(3)交叉后变异函数编写都很简单,random一个point,指定两个x在point位置进行切片交换即是交叉。变异也是random一个point,让其值0变为1,1变为0。
(4)得到交叉变异后的个体,需要计算fitness进行种群淘汰,保留fitness最高的一部分种群。
(5)将最优的个体继续上面的操作,直到你定义的iteration结束为止。
不说了,上代码:
import numpy as np import pandas as pd import random from scipy.optimize import fsolve import matplotlib.pyplot as plt import heapq from sklearn.model_selection import train_test_split from tkinter import _flatten from sklearn.utils import shuffle from sklearn import preprocessing from sklearn.decomposition import pca from matplotlib import rcparams # 求染色体长度 def getencodelength(decisionvariables, delta): # 将每个变量的编码长度放入数组 lengths = [] for decisionvar in decisionvariables: uper = decisionvar[1] low = decisionvar[0] # res()返回一个数组 res = fsolve(lambda x: ((uper - low) / delta - 2 ** x + 1), 30) # ceil()向上取整 length = int(np.ceil(res[0])) lengths.append(length) # print("染色体长度:", lengths) return lengths # 随机生成初始化种群 def getinitialpopulation(length, populationsize): chromsomes = np.zeros((populationsize, length), dtype=np.int) for popusize in range(populationsize): # np.random.randit()产生[0,2)之间的随机整数,第三个参数表示随机数的数量 chromsomes[popusize, :] = np.random.randint(0, 2, length) return chromsomes # 染色体解码得到表现形的解 def getdecode(population, encodelength, decisionvariables, delta): # 得到population中有几个元素 populationsize = population.shape[0] length = len(encodelength) decodevariables = np.zeros((populationsize, length), dtype=np.float) # 将染色体拆分添加到解码数组decodevariables中 for i, populationchild in enumerate(population): # 设置起始点 start = 0 for j, lengthchild in enumerate(encodelength): power = lengthchild - 1 decimal = 0 start_end = start + lengthchild for k in range(start, start_end): # 二进制转为十进制 decimal += populationchild[k] * (2 ** power) power = power - 1 # 从下一个染色体开始 start = start_end lower = decisionvariables[j][0] uper = decisionvariables[j][1] # 转换为表现形 decodevalue = lower + decimal * (uper - lower) / (2 ** lengthchild - 1) # 将解添加到数组中 decodevariables[i][j] = decodevalue return decodevariables # 选择新的种群 def selectnewpopulation(decodepopu, cum_probability): # 获取种群的规模和 m, n = decodepopu.shape # 初始化新种群 newpopulation = np.zeros((m, n)) for i in range(m): # 产生一个0到1之间的随机数 randomnum = np.random.random() # 轮盘赌选择 for j in range(m): if (randomnum < cum_probability[j]): newpopulation[i] = decodepopu[j] break return newpopulation # 新种群交叉 def crossnewpopulation(newpopu, prob): m, n = newpopu.shape # uint8将数值转换为无符号整型 numbers = np.uint8(m * prob) # 如果选择的交叉数量为奇数,则数量加1 if numbers % 2 != 0: numbers = numbers + 1 # 初始化新的交叉种群 updatepopulation = np.zeros((m, n), dtype=np.uint8) # 随机生成需要交叉的染色体的索引号 index = random.sample(range(m), numbers) # 不需要交叉的染色体直接复制到新的种群中 for i in range(m): if not index.__contains__(i): updatepopulation[i] = newpopu[i] # 交叉操作 j = 0 while j < numbers: # 随机生成一个交叉点,np.random.randint()返回的是一个列表 crosspoint = np.random.randint(0, n, 1) crosspoint = crosspoint[0] # a = index[j] # b = index[j+1] updatepopulation[index[j]][0:crosspoint] = newpopu[index[j]][0:crosspoint] updatepopulation[index[j]][crosspoint:] = newpopu[index[j + 1]][crosspoint:] updatepopulation[index[j + 1]][0:crosspoint] = newpopu[j + 1][0:crosspoint] updatepopulation[index[j + 1]][crosspoint:] = newpopu[index[j]][crosspoint:] j = j + 2 return updatepopulation # 变异操作 def mutation(crosspopulation, mutaprob): # 初始化变异种群 mutationpopu = np.copy(crosspopulation) m, n = crosspopulation.shape # 计算需要变异的基因数量 mutationnums = np.uint8(m * n * mutaprob) # 随机生成变异基因的位置 mutationindex = random.sample(range(m * n), mutationnums) # 变异操作 for geneindex in mutationindex: # np.floor()向下取整返回的是float型 row = np.uint8(np.floor(geneindex / n)) colume = geneindex % n if mutationpopu[row][colume] == 0: mutationpopu[row][colume] = 1 else: mutationpopu[row][colume] = 0 return mutationpopu # 找到重新生成的种群中适应度值最大的染色体生成新种群 def findmaxpopulation(population, maxevaluation, maxsize): #将数组转换为列表 #maxevalue = maxevaluation.flatten() maxevaluelist = maxevaluation # 找到前100个适应度最大的染色体的索引 maxindex = map(maxevaluelist.index, heapq.nlargest(maxsize, maxevaluelist)) index = list(maxindex) colume = population.shape[1] # 根据索引生成新的种群 maxpopulation = np.zeros((maxsize, colume)) i = 0 for ind in index: maxpopulation[i] = population[ind] i = i + 1 return maxpopulation # 得到每个个体的适应度值及累计概率 def getfitnessvalue(decode,x_train,y_train): # 得到种群的规模和决策变量的个数 popusize, decisionvar = decode.shape fitnessvalue = [] for j in range(len(decode)): w1 = decode[j][0:20].reshape(4,5) v1 = decode[j][20:25].t w2 = decode[j][25:45].reshape(5,4) v2 = decode[j][45:].t error_all = [] for i in range(len(x_train)): #get values of hidde layer x2 = sigmoid(x_train[i].t.dot(w1)+v1) #get values of prediction y y_hat = sigmoid(x2.t.dot(w2)+v2) #get error when input dimension is i error = sum(abs(y_hat - y_train[i])) error_all.append(error) #get fitness when w and v is j fitnessvalue.append(1/(1+sum(error_all))) # 得到每个个体被选择的概率 probability = fitnessvalue / np.sum(fitnessvalue) # 得到每个染色体被选中的累积概率,用于轮盘赌算子使用 cum_probability = np.cumsum(probability) return fitnessvalue, cum_probability def getfitnessvalue_accuracy(decode,x_train,y_train): # 得到种群的规模和决策变量的个数 popusize, decisionvar = decode.shape fitnessvalue = [] for j in range(len(decode)): w1 = decode[j][0:20].reshape(4,5) v1 = decode[j][20:25].t w2 = decode[j][25:45].reshape(5,4) v2 = decode[j][45:].t accuracy = [] for i in range(len(x_train)): #get values of hidde layer x2 = sigmoid(x_train[i].t.dot(w1)+v1) #get values of prediction y y_hat = sigmoid(x2.t.dot(w2)+v2) #get error when input dimension is i accuracy.append(sum(abs(np.round(y_hat) - y_train[i]))) fitnessvalue.append(sum([m == 0 for m in accuracy])/len(accuracy)) # 得到每个个体被选择的概率 probability = fitnessvalue / np.sum(fitnessvalue) # 得到每个染色体被选中的累积概率,用于轮盘赌算子使用 cum_probability = np.cumsum(probability) return fitnessvalue, cum_probability def getxy(): # 要打开的文件名 data_set = pd.read_csv('all-bp.csv', header=none) # 取出“特征”和“标签”,并做了转置,将列转置为行 x_minmax1 = data_set.iloc[:, 0:12].values # 前12列是特征 min_max_scaler = preprocessing.minmaxscaler() x_minmax = min_max_scaler.fit_transform(x_minmax1) # 0-1 range transfer = pca(n_components=0.9) data1 = transfer.fit_transform(x_minmax) #print('pca processed shape:',data1.shape) x = data1 y = data_set.iloc[ : , 12:16].values # 后3列是标签 # 分训练和测试集 x_train, x_test, y_train, y_test = train_test_split(x, y, test_size=0.3) return x_train, x_test, y_train, y_test def sigmoid(z): return 1 / (1 + np.exp(-z))
上面的计算适应度函数需要自己更具实际情况调整。
optimalvalue = [] optimalvariables = [] # 两个决策变量的上下界,多维数组之间必须加逗号 decisionvariables = [[-100,100]]*49 # 精度 delta = 0.001 # 获取染色体长度 encodelength = getencodelength(decisionvariables, delta) # 种群数量 initialpopusize = 100 # 初始生成100个种群,20,5,20,4分别对用w1,v1,w2,v2 population = getinitialpopulation(sum(encodelength), initialpopusize) print("polpupation.shape:",population.shape) # 最大进化代数 maxgeneration = 4000 # 交叉概率 prob = 0.8 # 变异概率 mutationprob = 0.5 # 新生成的种群数量 maxpopusize = 30 x_train, x_test, y_train, y_test = getxy() for generation in range(maxgeneration): # 对种群解码得到表现形 print(generation) decode = getdecode(population, encodelength, decisionvariables, delta) #print('the shape of decode:',decode.shape # 得到适应度值和累计概率值 evaluation, cum_proba = getfitnessvalue_accuracy(decode,x_train,y_train) # 选择新的种群 newpopulations = selectnewpopulation(population, cum_proba) # 新种群交叉 crosspopulations = crossnewpopulation(newpopulations, prob) # 变异操作 mutationpopulation = mutation(crosspopulations, mutationprob) # 将父母和子女合并为新的种群 totalpopulation = np.vstack((population, mutationpopulation)) # 最终解码 final_decode = getdecode(totalpopulation, encodelength, decisionvariables, delta) # 适应度评估 final_evaluation, final_cumprob = getfitnessvalue_accuracy(final_decode,x_train,y_train) #选出适应度最大的100个重新生成种群 population = findmaxpopulation(totalpopulation, final_evaluation, maxpopusize) # 找到本轮中适应度最大的值 optimalvalue.append(np.max(final_evaluation)) index = np.where(final_evaluation == max(final_evaluation)) optimalvariables.append(list(final_decode[index[0][0]]))
fig = plt.figure(dpi = 160,figsize=(5,4)) config = { "font.family":"serif", #serif "font.size": 10, "mathtext.fontset":'stix', } rcparams.update(config) plt.plot(np.arange(len(optimalvalue)), optimalvalue, color="y", lw=0.8, ls='-', marker='o', ms=8) # 图例设置 plt.xlabel('iteration') plt.ylabel('accuracy') plt.show()
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