模拟退火算法实例分析

1. 求解组合优化问题

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以TSP问题为例,以TSPLIB的berlin52为例进行求解,berlin52有52座城市,数据下载地址:https://wwwproxy.iwr.uni-heidelberg.de/groups/comopt/software/TSPLIB95/tsp/

clear   
    clc
    a = 0.99;   % 温度衰减函数的参数
    t0 = 97; tf = 3; t = t0;
    Markov_length = 10000;  % Markov链长度
    coordinates = [
1    565.0   575.0; 2     25.0   185.0; 3    345.0   750.0; 
4    945.0   685.0; 5    845.0   655.0; 6    880.0   660.0; 
7     25.0   230.0; 8    525.0  1000.0; 9    580.0  1175.0; 
10   650.0  1130.0; 11  1605.0   620.0; 12  1220.0   580.0; 
13  1465.0   200.0; 14  1530.0     5.0; 15   845.0   680.0; 
16   725.0   370.0; 17   145.0   665.0; 18   415.0   635.0; 
19   510.0   875.0; 20   560.0   365.0; 21   300.0   465.0; 
22   520.0   585.0; 23   480.0   415.0; 24   835.0   625.0; 
25   975.0   580.0; 26  1215.0   245.0; 27  1320.0   315.0; 
28  1250.0   400.0; 29   660.0   180.0; 30   410.0   250.0; 
31   420.0   555.0; 32   575.0   665.0; 33  1150.0  1160.0; 
34   700.0   580.0; 35   685.0   595.0; 36   685.0   610.0; 
37   770.0   610.0; 38   795.0   645.0; 39   720.0   635.0; 
40   760.0   650.0; 41   475.0   960.0; 42    95.0   260.0; 
43   875.0   920.0; 44   700.0   500.0; 45   555.0   815.0; 
46   830.0   485.0; 47  1170.0    65.0; 48   830.0   610.0; 
49   605.0   625.0; 50   595.0   360.0; 51  1340.0   725.0; 
52  1740.0   245.0; 
];
    coordinates(:,1) = []; % 除去第一列的城市编号
    amount = size(coordinates,1);   % 城市的数目
    % 通过向量化的方法计算距离矩阵
    dist_matrix = zeros(amount, amount);
    coor_x_tmp1 = coordinates(:,1) * ones(1,amount);
    coor_x_tmp2 = coor_x_tmp1';
    coor_y_tmp1 = coordinates(:,2) * ones(1,amount);
    coor_y_tmp2 = coor_y_tmp1';
    dist_matrix = sqrt((coor_x_tmp1-coor_x_tmp2).^2 + ...
                    (coor_y_tmp1-coor_y_tmp2).^2);

    sol_new = 1:amount;         % 产生初始解
% sol_new是每次产生的新解；sol_current是当前解；sol_best是冷却中的最好解；
    E_current = inf;E_best = inf;   % E_current是当前解对应的回路距离；
% E_new是新解的回路距离；
% E_best是最优解的
    sol_current = sol_new; sol_best = sol_new;          
    p = 1;

    while t>=tf
        for r=1:Markov_length       % Markov链长度
            % 产生随机扰动
            if (rand < 0.5) % 随机决定是进行两交换还是三交换
                % 两交换
                ind1 = 0; ind2 = 0;
                while (ind1 == ind2)
                    ind1 = ceil(rand.*amount);
                    ind2 = ceil(rand.*amount);
                end
                tmp1 = sol_new(ind1);
                sol_new(ind1) = sol_new(ind2);
                sol_new(ind2) = tmp1;
            else
                % 三交换
                ind1 = 0; ind2 = 0; ind3 = 0;
                while (ind1 == ind2) || (ind1 == ind3) ...
                    || (ind2 == ind3) || (abs(ind1-ind2) == 1)
                    ind1 = ceil(rand.*amount);
                    ind2 = ceil(rand.*amount);
                    ind3 = ceil(rand.*amount);
                end
                tmp1 = ind1;tmp2 = ind2;tmp3 = ind3;
                % 确保ind1 < ind2 < ind3
                if (ind1 < ind2) && (ind2 < ind3)
                    ;
                elseif (ind1 < ind3) && (ind3 < ind2)
                    ind2 = tmp3;ind3 = tmp2;
                elseif (ind2 < ind1) && (ind1 < ind3)
                    ind1 = tmp2;ind2 = tmp1;
                elseif (ind2 < ind3) && (ind3 < ind1) 
                    ind1 = tmp2;ind2 = tmp3; ind3 = tmp1;
                elseif (ind3 < ind1) && (ind1 < ind2)
                    ind1 = tmp3;ind2 = tmp1; ind3 = tmp2;
                elseif (ind3 < ind2) && (ind2 < ind1)
                    ind1 = tmp3;ind2 = tmp2; ind3 = tmp1;
                end

                tmplist1 = sol_new((ind1+1):(ind2-1));
                sol_new((ind1+1):(ind1+ind3-ind2+1)) = ...
                    sol_new((ind2):(ind3));
                sol_new((ind1+ind3-ind2+2):ind3) = ...
                    tmplist1;
            end

            %检查是否满足约束

            % 计算目标函数值（即内能）
            E_new = 0;
            for i = 1 : (amount-1)
                E_new = E_new + ...
                    dist_matrix(sol_new(i),sol_new(i+1));
            end
            % 再算上从最后一个城市到第一个城市的距离
            E_new = E_new + ...
                dist_matrix(sol_new(amount),sol_new(1));

            if E_new < E_current
                E_current = E_new;
                sol_current = sol_new;
                if E_new < E_best
% 把冷却过程中最好的解保存下来
                    E_best = E_new;
                    sol_best = sol_new;
                end
            else
                % 若新解的目标函数值小于当前解的，
                % 则仅以一定概率接受新解
                if rand < exp(-(E_new-E_current)./t)
                    E_current = E_new;
                    sol_current = sol_new;
                else    
                    sol_new = sol_current;
                end
            end
        end
        t=t.*a;     % 控制参数t（温度）减少为原来的a倍
    end

    disp('最优解为：')
    disp(sol_best)
    disp('最短距离：')
    disp(E_best)

运行结果:

2 求解背包问题

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在这个0-1背包的例子中,假设有12件物品,质量分别为2,5,18,3,2,5,10,4,11,7,14,6,价值分别为5,10,13,4,3,11,13,10,8,16,7,4,包的最大允许质量为46.

clear
clc
a = 0.95
k = [5;10;13;4;3;11;13;10;8;16;7;4];
k = -k; % 模拟退火算法是求解最小值，故取负数
d = [2;5;18;3;2;5;10;4;11;7;14;6];
restriction = 46;
num = 12;
sol_new = ones(1,num);         % 生成初始解
E_current = inf;E_best = inf;  
% E_current是当前解对应的目标函数值（即背包中物品总价值）；
% E_new是新解的目标函数值；
% E_best是最优解的
sol_current = sol_new; sol_best = sol_new;
t0=97; tf=3; t=t0;
p=1;

while t>=tf
    for r=1:100
        %产生随机扰动
        tmp=ceil(rand.*num);
        sol_new(1,tmp)=~sol_new(1,tmp);

        %检查是否满足约束
        while 1
            q=(sol_new*d <= restriction);
            if ~q
                p=~p;  %实现交错着逆转头尾的第一个1
                tmp=find(sol_new==1);
                if p
                    sol_new(1,tmp)=0;
                else
                    sol_new(1,tmp(end))=0;
                end
            else
                break
            end
        end

        % 计算背包中的物品价值
        E_new=sol_new*k;
        if E_new<E_current
            E_current=E_new;
            sol_current=sol_new;
            if E_new<E_best
                % 把冷却过程中最好的解保存下来
                E_best=E_new;
                sol_best=sol_new;
            end
        else
            if rand<exp(-(E_new-E_current)./t)
                E_current=E_new;
                sol_current=sol_new;
            else
                sol_new=sol_current;
            end
        end
    end
    t=t.*a;
end

disp('最优解为：')
sol_best
disp('物品总价值等于：')
val=-E_best;
disp(val)
disp('背包中物品重量是：')
disp(sol_best * d)

运行结果: