??W1?到的W???W?2? ?????W?n??注:在以上求特征根和特向量的方法中“和法”最简单。
例:在旅游问题中,求目标层到准则层的成对比较矩阵为A的特征向量和最大特征根: 选择旅游地
准则层:
景费居饮旅
色 用 住 食 途
方案层: P1 P2 P3
???112433???21755??10.5433??111???1?755??A??1?4723?=?2110.50.333?
?11?0.250.143211??11?????32?0.3330.2?0.3330.2311??151?35311??????W1?利用“和法”求A的特征向量W??????和特征根?max
??Wn??(S1)将A??Wij?nxn的元素按列归一化得:
??0.2650.2450.2350.2860.29?0.4890.4110.4760.484??A?W~ij??0.510nxn???0.0640.0700.0590.0480.032?
??0.0850.0980.1180.0950.097???0.0850.0980.1760.0950.097?? 16
?2?1?2?0.25?0.333?0.333?3.917?2?0.5?1?0.143?0.2?0.2?2.043?3?4?7?1?2?3?17
?4?3?5?0.5?1?1?10.5?5?3?5?0.333?1?1?10.333
(S2)将A?W~?~~n~ijnxn中元素Wij按行求和得各行元素之和:Wi??Wij
j?1??1.312?A?W~??2.37???0.273??W~i??
??0.493???0.511??(S3)再将上述矩阵向量归一化得到特征向量近似值,
??1.312??0.262??2.37????0.474?W?W~i1???n?0.273???0.055W4.999????? 特征向量
i?0.493??0.099?i?1??0.511????0.102??5其中
?W~i?(1.312?2.37?0.273?0.493?0.511)?4.999
1(S4)计算与特征向量相对应最大特征根(的近似值)
??1n?AW?imaxn?i?1Wi??1???nnnnna1jWi?a2jWi?a3jWi?a4jWi?a5jWi???i?j?1i?j?1i?j?1i?j?1i?j?1?5?W????1W2W3W4??W5???? 17
??0.262??0.262??0.262????????0.4740.4740.474?????????1 0.5 4 33??0.055??21 7 5 5??0.055??0.25 0.1431 0.5 0.333 ??0.055?????????0.099??0.099??0.099???0.102??0.102??0.102?1????????5???0.262?0.474?0.055????????0.262???0.474??0.262?????0.474????0.337 0.2 2 11 ???0.055??0.333 0.2 3 11 ??0.055???0.099????0.099????? ??0.102????0.102???0.099?0.102??????????1?0.263?0.237?0.22?0.297?0.3060.524?0.474?0.385?0.495?0.5??0.262?50.474? 0.066?0.068?0.055?0.0495?0.0340.087?0.095?00.055?.11?0.099?0.1020.099? 0.087?0.095?0.165?0.099?0.102?0.102???1?1.3232.3880.2730.49305??0.262?0.474?0.055?0.099?.548?0.102???15?5.05?5.038?4.960?4.98?5.373??15?25.401?5.0802??0.262??0.474??故有最大特征根?max?5.0802 , W???0.055?
???0.099??0.102??
18
对A一致性检验指标:CI??max?nn?1?5.0802?50.0802??0.02
44RI?1.12CR?故通过检验。
十、应用实例
对前面旅游问题进行决策
目标层: A 选择旅游地点
0.262 0.474 0.099 0.102 0.055
景费居饮
色 用 住 食 准则层:
B1 B2 B3 B4
0.595 0.129 0.129 0.277
决策层: P1 P2 P3
已知:①目标A对准则Bi i?1, 2, 3, 4, 5的权重向量为:
T,并已通过一致性检W??0.262 0.474 0.055 0.099 0.102?(由前面已算出)
0.02?0.018?0.11.12旅途 B5 验。
②准则B1, B2, B3, B4, B5相对于P1, P2, P3的成对比较矩阵为
B1对P1, P2, P3作用的成对比较矩阵为:
?b11b12?B1??b21b22?b?31b32b13??12??b23???Y21?1b33?Y???525??2? ?1??同样B2对P1, P2, P3作用的成对比较矩阵为:
19
?1?B1??3??8?13131??18??1? B??133??Y1??3?11Y33??3? 1???134??11???B4??111? B5??11?3??1?44?11???4?解:
1?4?1? 4?1??对以上每个比较矩阵都可计算出最大特征根?max及对象的特征向量W(即权重向量),并进行一致性检验:CI?RI CR
以B1为例用“和法”求出B1的特征根?max及对立的特征向量W1
25??1???B1??0.512?
?0.20.51????0.5880.5710.625???~(S1)对B1按列归一化得:B1Wij??0.2940.2860.25?
?0.1180.1430.125??????1.784???~(S2)对按列归一化反向量再按行求和:W??Wij??0.83?
j?1?0.386???n~Wi~(S3)对W按行归一化得到特征向量W W?n
~?Wii?1?1.784??0.595??1.784?0.83?0.386?????0.83??W??0.277?
?1.784?0.83?0.386?????0.386??0.129?????1.784?0.83?0.386????1(S4)计算特征根?max
(B)?max?1???BW1?? B??0.5ini?1Wi15??12?
?0.20.51???2 20
(目标管理)多目标决策模型层次分析法(H)代数模型离散模型
