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import random
import math
import numpy as np
import matplotlib.pyplot as plt
class PSO(object):
def __init__(self, num_city, data):
self.iter_max = 500 # 迭代数目
self.num = 150 # 粒子数目
self.num_city = num_city # 城市数
self.location = data # 城市的位置坐标
# 计算距离矩阵
self.dis_mat = self.compute_dis_mat(num_city, self.location) # 计算城市之间的距离矩阵
# 初始化所有粒子
self.particals = self.random_init(self.num, num_city)
self.lenths = self.compute_paths(self.particals)
# 得到初始化群体的最优解
init_l = min(self.lenths)
init_index = self.lenths.index(init_l)
init_path = self.particals[init_index]
# 画出初始的路径图
init_show = self.location[init_path]
plt.subplot(2, 2, 2)
plt.title('init best result')
plt.plot(init_show[:, 0], init_show[:, 1])
# 记录每个个体的当前最优解
self.local_best = self.particals
self.local_best_len = self.lenths
# 记录当前的全局最优解,长度是iteration
self.global_best = init_path
self.global_best_len = init_l
# 输出解
self.best_l = self.global_best_len
self.best_path = self.global_best
# 存储每次迭代的结果,画出收敛图
self.iter_x = [0]
self.iter_y = [init_l]
# 随机初始化
def random_init(self, num_total, num_city):
tmp = [x for x in range(num_city)]
result = []
for i in range(num_total):
random.shuffle(tmp)
result.append(tmp.copy())
return result
# 计算不同城市之间的距离
def compute_dis_mat(self, num_city, location):
dis_mat = np.zeros((num_city, num_city))
for i in range(num_city):
for j in range(num_city):
if i == j:
dis_mat[i][j] = np.inf
continue
a = location[i]
b = location[j]
tmp = np.sqrt(sum([(x[0] - x[1]) ** 2 for x in zip(a, b)]))
dis_mat[i][j] = tmp
return dis_mat
# 计算一条路径的长度
def compute_pathlen(self, path, dis_mat):
a = path[0]
b = path[-1]
result = dis_mat[a][b]
for i in range(len(path) - 1):
a = path[i]
b = path[i + 1]
result += dis_mat[a][b]
return result
# 计算一个群体的长度
def compute_paths(self, paths):
result = []
for one in paths:
length = self.compute_pathlen(one, self.dis_mat)
result.append(length)
return result
# 评估当前的群体
def eval_particals(self):
min_lenth = min(self.lenths)
min_index = self.lenths.index(min_lenth)
cur_path = self.particals[min_index]
# 更新当前的全局最优
if min_lenth < self.global_best_len:
self.global_best_len = min_lenth
self.global_best = cur_path
# 更新当前的个体最优
for i, l in enumerate(self.lenths):
if l < self.local_best_len[i]:
self.local_best_len[i] = l
self.local_best[i] = self.particals[i]
# 粒子交叉
def cross(self, cur, best):
one = cur.copy()
l = [t for t in range(self.num_city)]
t = np.random.choice(l,2)
x = min(t)
y = max(t)
cross_part = best[x:y]
tmp = []
for t in one:
if t in cross_part:
continue
tmp.append(t)
# 两种交叉方法
one = tmp + cross_part
l1 = self.compute_pathlen(one, self.dis_mat)
one2 = cross_part + tmp
l2 = self.compute_pathlen(one2, self.dis_mat)
if l1<l2:
return one, l1
else:
return one, l2
# 粒子变异
def mutate(self, one):
one = one.copy()
l = [t for t in range(self.num_city)]
t = np.random.choice(l, 2)
x, y = min(t), max(t)
one[x], one[y] = one[y], one[x]
l2 = self.compute_pathlen(one,self.dis_mat)
return one, l2
# 迭代操作
def pso(self):
for cnt in range(1, self.iter_max):
# 更新粒子群
for i, one in enumerate(self.particals):
tmp_l = self.lenths[i]
# 与当前个体局部最优解进行交叉
new_one, new_l = self.cross(one, self.local_best[i])
if new_l < self.best_l:
self.best_l = tmp_l
self.best_path = one
if new_l < tmp_l or np.random.rand()<0.1:
one = new_one
tmp_l = new_l
# 与当前全局最优解进行交叉
new_one, new_l = self.cross(one, self.global_best)
if new_l < self.best_l:
self.best_l = tmp_l
self.best_path = one
if new_l < tmp_l or np.random.rand()<0.1:
one = new_one
tmp_l = new_l
# 变异
one, tmp_l = self.mutate(one)
if new_l < self.best_l:
self.best_l = tmp_l
self.best_path = one
if new_l < tmp_l or np.random.rand()<0.1:
one = new_one
tmp_l = new_l
# 更新该粒子
self.particals[i] = one
self.lenths[i] = tmp_l
# 评估粒子群,更新个体局部最优和个体当前全局最优
self.eval_particals()
# 更新输出解
if self.global_best_len < self.best_l:
self.best_l = self.global_best_len
self.best_path = self.global_best
print(cnt)
self.iter_x.append(cnt)
self.iter_y.append(self.best_l)
return self.best_l, self.best_path
def run(self):
best_length, best_path = self.pso()
# 画出最终路径
plt.subplot(2, 2, 4)
plt.title('convergence curve')
plt.plot(self.iter_x, self.iter_y)
return self.location[best_path], best_length
# 读取数据
def read_tsp(path):
lines = open(path, 'r').readlines()
assert 'NODE_COORD_SECTION\n' in lines
index = lines.index('NODE_COORD_SECTION\n')
data = lines[index + 1:-1]
tmp = []
for line in data:
line = line.strip().split(' ')
if line[0] == 'EOF':
continue
tmpline = []
for x in line:
if x == '':
continue
else:
tmpline.append(float(x))
if tmpline == []:
continue
tmp.append(tmpline)
data = tmp
return data
data = read_tsp('data/st70.tsp')
data = np.array(data)
plt.suptitle('PSO in st70.tsp')
data = data[:, 1:]
plt.subplot(2, 2, 1)
plt.title('raw data')
# 加上一行因为会回到起点
show_data = np.vstack([data, data[0]])
plt.plot(data[:, 0], data[:, 1])
pso = PSO(num_city=data.shape[0], data=data.copy())
Best_path, Best = pso.run()
print(Best)
plt.subplot(2, 2, 3)
Best_path = np.vstack([Best_path, Best_path[0]])
plt.plot(Best_path[:, 0], Best_path[:, 1])
plt.title('result')
plt.show()
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