大橙子网站建设,新征程启航
为企业提供网站建设、域名注册、服务器等服务
这篇文章给大家介绍使用python3怎么实现一个单目标粒子群算法,内容非常详细,感兴趣的小伙伴们可以参考借鉴,希望对大家能有所帮助。
创新互联公司专注于企业全网营销推广、网站重做改版、城关网站定制设计、自适应品牌网站建设、H5场景定制、商城网站建设、集团公司官网建设、成都外贸网站制作、高端网站制作、响应式网页设计等建站业务,价格优惠性价比高,为城关等各大城市提供网站开发制作服务。1) 初始化粒子群;
随机设置各粒子的位置和速度,默认粒子的初始位置为粒子最优位置,并根据所有粒子最优位置,选取群体最优位置。
2) 判断是否达到迭代次数;
若没有达到,则跳转到步骤3)。否则,直接输出结果。
3) 更新所有粒子的位置和速度;
4) 计算各粒子的适应度值。
将粒子当前位置的适应度值与粒子最优位置的适应度值进行比较,决定是否更新粒子最优位置;将所有粒子最优位置的适应度值与群体最优位置的适应度值进行比较,决定是否更新群体最优位置。然后,跳转到步骤2)。
直接扔代码......(PS:1.参数动态调节;2.例子是二维的)
首先,是一些准备工作...
# Import libs import numpy as np import random as rd import matplotlib.pyplot as plt # Constant definition MIN_POS = [-5, -5] # Minimum position of the particle MAX_POS = [5, 5] # Maximum position of the particle MIN_SPD = [-0.5, -0.5] # Minimum speed of the particle MAX_SPD = [1, 1] # Maximum speed of the particle C1_MIN = 0 C1_MAX = 1.5 C2_MIN = 0 C2_MAX = 1.5 W_MAX = 1.4 W_MIN = 0
然后是PSO类
# Class definition class PSO(): """ PSO class """ def __init__(self,iters=100,pcount=50,pdim=2,mode='min'): """ PSO initialization ------------------ """ self.w = None # Inertia factor self.c1 = None # Learning factor self.c2 = None # Learning factor self.iters = iters # Number of iterations self.pcount = pcount # Number of particles self.pdim = pdim # Particle dimension self.gbpos = np.array([0.0]*pdim) # Group optimal position self.mode = mode # The mode of PSO self.cur_pos = np.zeros((pcount, pdim)) # Current position of the particle self.cur_spd = np.zeros((pcount, pdim)) # Current speed of the particle self.bpos = np.zeros((pcount, pdim)) # The optimal position of the particle self.trace = [] # Record the function value of the optimal solution def init_particles(self): """ init_particles function ----------------------- """ # Generating particle swarm for i in range(self.pcount): for j in range(self.pdim): self.cur_pos[i,j] = rd.uniform(MIN_POS[j], MAX_POS[j]) self.cur_spd[i,j] = rd.uniform(MIN_SPD[j], MAX_SPD[j]) self.bpos[i,j] = self.cur_pos[i,j] # Initial group optimal position for i in range(self.pcount): if self.mode == 'min': if self.fitness(self.cur_pos[i]) < self.fitness(self.gbpos): gbpos = self.cur_pos[i] elif self.mode == 'max': if self.fitness(self.cur_pos[i]) > self.fitness(self.gbpos): gbpos = self.cur_pos[i] def fitness(self, x): """ fitness function ---------------- Parameter: x : """ # Objective function fitval = 5*np.cos(x[0]*x[1])+x[0]*x[1]+x[1]**3 # min # Retyrn value return fitval def adaptive(self, t, p, c1, c2, w): """ """ #w = 0.95 #0.9-1.2 if t == 0: c1 = 0 c2 = 0 w = 0.95 else: if self.mode == 'min': # c1 if self.fitness(self.cur_pos[p]) > self.fitness(self.bpos[p]): c1 = C1_MIN + (t/self.iters)*C1_MAX + np.random.uniform(0,0.1) elif self.fitness(self.cur_pos[p]) <= self.fitness(self.bpos[p]): c1 = c1 # c2 if self.fitness(self.bpos[p]) > self.fitness(self.gbpos): c2 = C2_MIN + (t/self.iters)*C2_MAX + np.random.uniform(0,0.1) elif self.fitness(self.bpos[p]) <= self.fitness(self.gbpos): c2 = c2 # w #c1 = C1_MAX - (C1_MAX-C1_MIN)*(t/self.iters) #c2 = C2_MIN + (C2_MAX-C2_MIN)*(t/self.iters) w = W_MAX - (W_MAX-W_MIN)*(t/self.iters) elif self.mode == 'max': pass return c1, c2, w def update(self, t): """ update function --------------- Note that : 1. Update particle position 2. Update particle speed 3. Update particle optimal position 4. Update group optimal position """ # Part1 : Traverse the particle swarm for i in range(self.pcount): # Dynamic parameters self.c1, self.c2, self.w = self.adaptive(t,i,self.c1,self.c2,self.w) # Calculate the speed after particle iteration # Update particle speed self.cur_spd[i] = self.w*self.cur_spd[i] \ +self.c1*rd.uniform(0,1)*(self.bpos[i]-self.cur_pos[i])\ +self.c2*rd.uniform(0,1)*(self.gbpos - self.cur_pos[i]) for n in range(self.pdim): if self.cur_spd[i,n] > MAX_SPD[n]: self.cur_spd[i,n] = MAX_SPD[n] elif self.cur_spd[i,n] < MIN_SPD[n]: self.cur_spd[i,n] = MIN_SPD[n] # Calculate the position after particle iteration # Update particle position self.cur_pos[i] = self.cur_pos[i] + self.cur_spd[i] for n in range(self.pdim): if self.cur_pos[i,n] > MAX_POS[n]: self.cur_pos[i,n] = MAX_POS[n] elif self.cur_pos[i,n] < MIN_POS[n]: self.cur_pos[i,n] = MIN_POS[n] # Part2 : Update particle optimal position for k in range(self.pcount): if self.mode == 'min': if self.fitness(self.cur_pos[k]) < self.fitness(self.bpos[k]): self.bpos[k] = self.cur_pos[k] elif self.mode == 'max': if self.fitness(self.cur_pos[k]) > self.fitness(self.bpos[k]): self.bpos[k] = self.cur_pos[k] # Part3 : Update group optimal position for k in range(self.pcount): if self.mode == 'min': if self.fitness(self.bpos[k]) < self.fitness(self.gbpos): self.gbpos = self.bpos[k] elif self.mode == 'max': if self.fitness(self.bpos[k]) > self.fitness(self.gbpos): self.gbpos = self.bpos[k] def run(self): """ run function ------------- """ # Initialize the particle swarm self.init_particles() # Iteration for t in range(self.iters): # Update all particle information self.update(t) # self.trace.append(self.fitness(self.gbpos))
然后是main...
def main(): """ main function """ for i in range(1): pso = PSO(iters=100,pcount=50,pdim=2, mode='min') pso.run() # print('='*40) print('= Optimal solution:') print('= x=', pso.gbpos[0]) print('= y=', pso.gbpos[1]) print('= Function value:') print('= f(x,y)=', pso.fitness(pso.gbpos)) #print(pso.w) print('='*40) # plt.plot(pso.trace, 'r') title = 'MIN: ' + str(pso.fitness(pso.gbpos)) plt.title(title) plt.xlabel("Number of iterations") plt.ylabel("Function values") plt.show() # input('= Press any key to exit...') print('='*40) exit() if __name__ == "__main__": main()
最后是计算结果,完美结束!!!
关于使用python3怎么实现一个单目标粒子群算法就分享到这里了,希望以上内容可以对大家有一定的帮助,可以学到更多知识。如果觉得文章不错,可以把它分享出去让更多的人看到。