# Program Name: NSGA-II.py # Description: This is a python implementation of Prof. Kalyanmoy Deb's popular NSGA-II algorithm # Author: Haris Ali Khan # Supervisor: Prof. Manoj Kumar Tiwari #Importing required modules import math import random import matplotlib.pyplot as plt #First function to optimize def function1(x): value = -x**2 return value #Second function to optimize def function2(x): value = -(x-2)**2 return value #Function to find index of list def index_of(a,list): for i in range(0,len(list)): if list[i] == a: return i return -1 #Function to sort by values def sort_by_values(list1, values): sorted_list = [] while(len(sorted_list)!=len(list1)): if index_of(min(values),values) in list1: sorted_list.append(index_of(min(values),values)) values[index_of(min(values),values)] = math.inf return sorted_list #Function to carry out NSGA-II's fast non dominated sort def fast_non_dominated_sort(values1, values2): S=[[] for i in range(0,len(values1))] front = [[]] n=[0 for i in range(0,len(values1))] rank = [0 for i in range(0, len(values1))] for p in range(0,len(values1)): S[p]=[] n[p]=0 for q in range(0, len(values1)): if (values1[p] > values1[q] and values2[p] > values2[q]) or (values1[p] >= values1[q] and values2[p] > values2[q]) or (values1[p] > values1[q] and values2[p] >= values2[q]): if q not in S[p]: S[p].append(q) elif (values1[q] > values1[p] and values2[q] > values2[p]) or (values1[q] >= values1[p] and values2[q] > values2[p]) or (values1[q] > values1[p] and values2[q] >= values2[p]): n[p] = n[p] + 1 if n[p]==0: rank[p] = 0 if p not in front[0]: front[0].append(p) i = 0 while(front[i] != []): Q=[] for p in front[i]: for q in S[p]: n[q] =n[q] - 1 if( n[q]==0): rank[q]=i+1 if q not in Q: Q.append(q) i = i+1 front.append(Q) del front[len(front)-1] return front #Function to calculate crowding distance def crowding_distance(values1, values2, front): distance = [0 for i in range(0,len(front))] sorted1 = sort_by_values(front, values1[:]) sorted2 = sort_by_values(front, values2[:]) distance[0] = 4444444444444444 distance[len(front) - 1] = 4444444444444444 for k in range(1,len(front)-1): distance[k] = distance[k]+ (values1[sorted1[k+1]] - values2[sorted1[k-1]])/(max(values1)-min(values1)) for k in range(1,len(front)-1): distance[k] = distance[k]+ (values1[sorted2[k+1]] - values2[sorted2[k-1]])/(max(values2)-min(values2)) return distance #Function to carry out the crossover def crossover(a,b): r=random.random() if r>0.5: return mutation((a+b)/2) else: return mutation((a-b)/2) #Function to carry out the mutation operator def mutation(solution): mutation_prob = random.random() if mutation_prob <1: solution = min_x+(max_x-min_x)*random.random() return solution #Main program starts here pop_size = 20 max_gen = 921 #Initialization min_x=-55 max_x=55 solution=[min_x+(max_x-min_x)*random.random() for i in range(0,pop_size)] gen_no=0 while(gen_no<max_gen): function1_values = [function1(solution[i])for i in range(0,pop_size)] function2_values = [function2(solution[i])for i in range(0,pop_size)] non_dominated_sorted_solution = fast_non_dominated_sort(function1_values[:],function2_values[:]) print("The best front for Generation number ",gen_no, " is") for valuez in non_dominated_sorted_solution[0]: print(round(solution[valuez],3),end=" ") print(" ") crowding_distance_values=[] for i in range(0,len(non_dominated_sorted_solution)): crowding_distance_values.append(crowding_distance(function1_values[:],function2_values[:],non_dominated_sorted_solution[i][:])) solution2 = solution[:] #Generating offsprings while(len(solution2)!=2*pop_size): a1 = random.randint(0,pop_size-1) b1 = random.randint(0,pop_size-1) solution2.append(crossover(solution[a1],solution[b1])) function1_values2 = [function1(solution2[i])for i in range(0,2*pop_size)] function2_values2 = [function2(solution2[i])for i in range(0,2*pop_size)] non_dominated_sorted_solution2 = fast_non_dominated_sort(function1_values2[:],function2_values2[:]) crowding_distance_values2=[] for i in range(0,len(non_dominated_sorted_solution2)): crowding_distance_values2.append(crowding_distance(function1_values2[:],function2_values2[:],non_dominated_sorted_solution2[i][:])) new_solution= [] for i in range(0,len(non_dominated_sorted_solution2)): non_dominated_sorted_solution2_1 = [index_of(non_dominated_sorted_solution2[i][j],non_dominated_sorted_solution2[i] ) for j in range(0,len(non_dominated_sorted_solution2[i]))] front22 = sort_by_values(non_dominated_sorted_solution2_1[:], crowding_distance_values2[i][:]) front = [non_dominated_sorted_solution2[i][front22[j]] for j in range(0,len(non_dominated_sorted_solution2[i]))] front.reverse() for value in front: new_solution.append(value) if(len(new_solution)==pop_size): break if (len(new_solution) == pop_size): break solution = [solution2[i] for i in new_solution] gen_no = gen_no + 1 print(solution) #Lets plot the final front now function1 = [i * -1 for i in function1_values] function2 = [j * -1 for j in function2_values] plt.xlabel('Function 1', fontsize=15) plt.ylabel('Function 2', fontsize=15) plt.scatter(function1, function2) plt.show()
总结一下
初始化种群
开始迭代
生成子代2N
求子代的非支配集合
根据子代的非支配集合求其拥挤度距离
根据拥挤距离排序,选择子代N
直到达到循环结束条件
最后生成的解集即为所求,每个解都有相同的优先度