基本遗传算法参数
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种群大小(popsize) = 100
染色体长度(lchrom) = 22
最大进化代数(maxgen) = 300
交叉概率(pcross) = 0.500000
变异概率(pmutation) = 0.500000
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第 1 / 1 次运行: 当前代为 1, 共 300 代
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模拟计算统计报告
世代数 0 世代数 1
个体 染色体编码 适应度 父个体 交叉位置 染色体编码 适应度
--------------------------------------------------------------------------------
1) 1110010101100101111110 2.237770 | (61,61) -1 0101111010000111001111 3.840685
2) 0010010001001011110010 2.056160 | (11,11) -1 1110001010010111000111 3.416043
3) 1101110010010001001001 1.724643 | (27,27) -1 0111010101101000001011 3.392374
4) 0101011111110111111111 1.815514 | (29,29) -1 0011001000001000000011 3.247481
5) 1011101110101010011111 0.776157 | (39,39) -1 1001000001000111111101 3.226075
6) 1010000010011011111001 2.734757 | (63,63) -1 1100001001101001111001 2.842247
7) 1001000100011001111110 2.269701 | (14,52) 0 1010000101110011101101 0.857276
8) 0010000110011101101010 2.009996 | (14,52) 0 0001111111100111101000 1.519218
9) 0110010000011010110011 2.296777 | (63, 7) 14 1101010001111011001001 1.436303
10) 1011111001001111001111 3.813425 | (63, 7) 14 0101110101000001011100 1.813541
11) 1110001010010111000111 3.416043 | (93,20) 13 0000111101010001110111 1.503869
12) 0001011101011100110101 2.757243 | (93,20) 13 0010000100010111111000 2.500858
13) 0111000100000111111011 2.920339 | (94,23) 1 0111001010010110111111 0.496456
14) 1000000000110000000111 3.227270 | (94,23) 1 0100111011001001011001 2.207108
15) 1001000100100110111000 2.649595 | ( 7,73) 1 0011101010110100100000 1.067666
16) 0011011010111101010101 2.108064 | ( 7,73) 1 0000000100100010101100 1.759754
17) 1111010101000010010100 1.707720 | (18,53) 0 0010100001011101001011 3.146361
18) 1111001100101001000010 2.146003 | (18,53) 0 1100000101101001011111 0.310974
19) 0111001010100001111100 2.207374 | (98,36) 15 1111110100110101000000 1.188453
20) 1110100010011100001100 2.320744 | (98,36) 15 0000000111001101101100 1.652814
21) 1100000000010010011100 1.729167 | (98,73) 0 1011001011011101010100 2.047481
22) 1101001110110000000011 3.248584 | (98,73) 0 0101101000100101001010 2.027581
23) 1010101111111011011110 2.445549 | (45,70) 0 0111110011110011100001 1.731595
24) 0111101111000000111001 2.652241 | (45,70) 0 1110110000001111101010 2.022055
25) 1110001011011011111111 1.582100 | (27, 3) 17 0010001001000001100000 1.260879
26) 0001001001000011011110 2.427331 | (27, 3) 17 0111000100101111010111 0.393397
27) 0111010101101000001011 3.392374 | (83,21) 0 1011111001101110100010 1.900053
28) 0010000110011010111000 2.645780 | (83,21) 0 1111001010000100010111 0.786122
29) 0011001000001000000011 3.247481 | (65,29) 17 1100101111101010000010 2.204696
30) 0010001000101001110011 2.751156 | (65,29) 17 1110010100101001100001 1.582671
31) 0001101011111010010100 1.784282 | (53,49) 0 0010111000101011011001 2.485231
32) 1000000111100100000110 1.887834 | (53,49) 0 1111111000001100000000 1.727079
33) 0011101000100010111001 2.804578 | (65,10) 0 0010101010111010011110 2.283328
34) 0111011011000101011011 0.534058 | (65,10) 0 0011001111010111111001 2.683380
35) 0011001011011100100000 1.085399 | ( 8,61) 0 1101000001001111011001 2.594122
36) 1100100010100001011001 2.141426 | ( 8,61) 0 1111010001100010100011 1.605988
37) 1111100101111101111110 2.179240 | (53,15) 0 0010101001110000010010 1.847370
38) 0001111010010001010100 1.903943 | (53,15) 0 0110011011001101111101 3.117919
39) 1001000001000111111101 3.226075 | ( 1,18) 0 1111111111101111011100 2.015548
40) 0101001100011100100101 1.208587 | ( 1,18) 0 1011010111011001101100 1.663813
41) 1001110111000011001010 2.019811 | (92,93) 0 1101100010111010100010 1.921178
42) 0111010111000110100001 1.497498 | (92,93) 0 0000101100000110110100 2.404266
43) 1011101101100010111000 2.633314 | (99,93) 13 1010111011101001111110 2.272054
44) 0100110011111001010010 1.904396 | (99,93) 13 1110101010101101000001 1.539312
45) 1000011100010011011000 2.365997 | (12,42) 4 0001011011000011100110 2.049460
46) 1110101011111110110001 2.601267 | (12,42) 4 0100110001100000110101 2.510956
47) 1110111001111101100101 1.064685 | ( 9,61) 17 1110101100101001001010 2.031528
48) 1011100011110111111111 1.806371 | ( 9,61) 17 0100011010010010011000 1.882817
49) 1100001011110010100110 1.922704 | (16, 6) 0 1010011111001111010010 1.960256
50) 1110010111110101010010 1.914810 | (16, 6) 0 0001010111110110110010 2.030308
51) 0010100111100100000110 1.887793 | (19,72) 1 1101110000111001111000 2.628937
52) 0100101101000110011000 1.985575 | (19,72) 1 1100110011101111010101 2.432150
53) 0100101010111100001101 2.788953 | ( 2,78) 0 0000010111101110000001 1.668535
54) 0110010101011010111010 2.015630 | ( 2,78) 0 1111111001111000010010 1.849367
55) 1101001111110011011000 2.387867 | (36,11) 21 0010010000101011000001 1.493909
56) 1101011010111101100000 1.497166 | (36,11) 21 0011001000100000001111 2.735142
57) 1000000111111000111110 2.441097 | (80,61) 0 0110101000010011000100 1.788889
58) 0101110111101100101011 2.253287 | (80,61) 0 1010101001001111001001 1.383632
59) 1000101100110111001001 1.397294 | (89, 1) 0 1110000010110101011100 1.884504
60) 1001001010001101101110 1.900614 | (89, 1) 0 1111110110101101010101 2.063835
61) 0101111010000111001111 3.840685 | (77,88) 0 1000101101110100111110 2.430870
62) 0101101011000110011000 1.987717 | (77,88) 0 0101111100011100110110 2.188608
63) 1100001001101001111001 2.842247 | ( 8,23) 0 0010111011001000101001 1.314419
64) 1110011111110110000010 2.183578 | ( 8,23) 0 0011010110000001011010 2.054318
65) 0100001110110001000101 1.972914 | (10,62) 0 0101110001111101110011 3.022320
66) 0111000011001011100111 1.444869 | (10,62) 0 1000111001000011011010 2.057700
67) 1111100101000011011010 2.057693 | (93,48) 0 1010000110110001011100 1.831072
68) 0010000011010001011100 1.826963 | (93,48) 0 0010111111100011110010 2.054938
69) 1000100001101010111110 2.388758 | (49,41) 4 1110010001011110100111 2.304787
70) 0101000001001010001000 1.936885 | (49,41) 4 1101000010010101111010 1.969312
71) 0001010111001011100110 2.069045 | ( 3,30) 0 0101101100010011010010 1.931386
72) 1111110101011110100101 1.070482 | ( 3,30) 0 1110101100111110100001 1.536295
73) 0010001010010011110001 2.440339 | (94,42) 0 0001010001001111111100 2.251734
74) 1110111000111111010011 1.569570 | (94,42) 0 0011101001110101000000 1.183834
75) 1010001110000100100101 1.283826 | (39, 7) 0 1010010101110110000100 2.089726
76) 1100011101011001000010 2.139333 | (39, 7) 0 0011111000100011000100 1.800868
77) 1101010001111110010010 1.885081 | (52,56) 0 0010001010110110011111 0.585184
78) 0010100011011001110000 2.686983 | (52,56) 0 1110011001001111111011 3.054156
79) 1011010010100110110000 2.806341 | (51,57) 1 1110000011110110111101 2.822128
80) 1100010100011011011010 2.056148 | (51,57) 1 0000110110001100001010 2.053097
81) 1100011110001001100000 1.316517 | (84,24) 0 0000110110111101001101 2.095249
82) 0111001111110011101001 1.411472 | (84,24) 0 1100000100001100100110 1.897265
83) 1101100110101100101010 2.001054 | (16,45) 0 0011111101001101111110 2.208288
84) 1111110001010101101000 1.351436 | (16,45) 0 0101010110101110011100 1.793025
85) 0010010100101010110001 2.644020 | (37,20) 15 0110111101000100110010 1.990396
86) 0010000010110100011011 0.543614 | (37,20) 15 1000111101101111000101 1.454053
87) 1000111110100000111000 2.532765 | (11,75) 6 1110011111101011100111 1.399662
88) 0111111100111001101000 1.324845 | (11,75) 6 1000110001011100001110 1.785112
89)
遗传算法-C语言求解函数实现
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2023-04-04
17:21:38
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