流程图
输入
直接影响矩阵
参数设置
第一、归一化方法的设置
第二、截距值的获得
输出结果
第一、一组成对的对抗层级拓扑图
第二、带综合影响值的MR的直角坐标几何分布图
原始矩阵(直接影响矩阵)为
$$Ori=\begin{array}{|c|c|c|c|c|c|c|}\hline {M_{16 \times16}} &C1 &C2 &C3 &C4 &C5 &E1 &E2 &E3 &F1 &F2 &F3 &U1 &U2 &D1 &D2 &D3\\ \hline C1 &0 &7.12 &7.52 &8.9 &7.36 &8.24 &8.56 &8.4 &8.92 &1.28 &1.4 &8.08 &8.92 &2.36 &7.12 &1.04\\ \hline C2 &8.32 &0 &5.12 &8.88 &8.92 &2.16 &2.96 &7.16 &8.92 &1.56 &5.16 &4.12 &5 &5.12 &4.12 &2.68\\ \hline C3 &7.44 &2.32 &0 &8.8 &3.08 &7.12 &1.04 &8.92 &8.56 &0.24 &0.26 &5.52 &6.64 &4.48 &6.52 &3.08\\ \hline C4 &7.04 &5.12 &2.04 &0 &8.76 &7.16 &2.48 &7.28 &8.16 &1.2 &2.12 &5.08 &8.6 &3.12 &6.08 &2.2\\ \hline C5 &4.24 &4.52 &3.96 &7.08 &0 &4.84 &4.76 &6.56 &8.72 &1.76 &2.12 &2.96 &8.8 &4.16 &6 &3.04\\ \hline E1 &2.12 &1.5 &0.92 &7.12 &2.48 &0 &6.2 &5.04 &8.76 &3.28 &4.52 &2.24 &8.72 &3.5 &8.6 &5.64\\ \hline E2 &2 &7.04 &1.08 &8.72 &3.24 &8.2 &0 &7.08 &8.4 &8.6 &8 &2.12 &8.4 &6.2 &6.84 &8.24\\ \hline E3 &7.02 &3.2 &2.5 &8.96 &4.24 &4.88 &5.24 &0 &6.12 &2.24 &6.2 &2 &8.6 &3.52 &4.22 &6.2\\ \hline F1 &8.56 &8.92 &6.52 &8.6 &8.6 &7.2 &8.2 &8.4 &0 &2.2 &2 &1.12 &2 &5.08 &2.04 &6\\ \hline F2 &1.04 &1.52 &0.096 &1.08 &1.12 &3.04 &3.52 &2.04 &1.56 &0 &7.8 &1.52 &1.5 &6 &2.52 &6.5\\ \hline F3 &4.5 &6.04 &1 &1.16 &2.52 &8 &8.04 &8.96 &2.5 &8.25 &0 &1.24 &1.4 &7.04 &7.72 &7.5\\ \hline U1 &7.08 &8.72 &7.08 &6.52 &1.5 &6.28 &3.2 &8 &4.56 &2.04 &4 &0 &8.4 &7.2 &5.56 &3\\ \hline U2 &7.04 &4.96 &6.08 &7.52 &5.02 &7.2 &7 &8.12 &6.5 &2.12 &2 &8.88 &0 &1.24 &0.64 &8.2\\ \hline D1 &2 &1.04 &3.56 &6.96 &6.52 &8.6 &6.96 &6.4 &2.28 &1.02 &8.2 &1.02 &6.5 &0 &7.64 &8.92\\ \hline D2 &6.08 &7.02 &1.12 &8.32 &7 &8.24 &4.04 &8.92 &8.68 &4.12 &3.32 &8.12 &5.08 &8.92 &0 &3.04\\ \hline D3 &1.2 &1 &0.92 &8.76 &2.12 &8.96 &8.24 &7.28 &0.8 &6.52 &7.16 &8.52 &3.2 &7.2 &8.92 &0\\ \hline \end{array} $$
规范直接关系矩阵求解过程 $$ \require{cancel} \require{AMScd} \begin{CD} O @>>>N \\ \end{CD} $$
- $$\mathcal{N}=\begin{array}{|c|c|c|c|c|c|c|}\hline {M_{16 \times16}} &C1 &C2 &C3 &C4 &C5 &E1 &E2 &E3 &F1 &F2 &F3 &U1 &U2 &D1 &D2 &D3\\ \hline C1 &0 &0.049 &0.052 &0.062 &0.051 &0.057 &0.059 &0.058 &0.062 &0.009 &0.01 &0.056 &0.062 &0.016 &0.049 &0.007\\ \hline C2 &0.058 &0 &0.035 &0.061 &0.062 &0.015 &0.02 &0.05 &0.062 &0.011 &0.036 &0.029 &0.035 &0.035 &0.029 &0.019\\ \hline C3 &0.052 &0.016 &0 &0.061 &0.021 &0.049 &0.007 &0.062 &0.059 &0.002 &0.002 &0.038 &0.046 &0.031 &0.045 &0.021\\ \hline C4 &0.049 &0.035 &0.014 &0 &0.061 &0.05 &0.017 &0.05 &0.057 &0.008 &0.015 &0.035 &0.06 &0.022 &0.042 &0.015\\ \hline C5 &0.029 &0.031 &0.027 &0.049 &0 &0.034 &0.033 &0.045 &0.06 &0.012 &0.015 &0.02 &0.061 &0.029 &0.042 &0.021\\ \hline E1 &0.015 &0.01 &0.006 &0.049 &0.017 &0 &0.043 &0.035 &0.061 &0.023 &0.031 &0.016 &0.06 &0.024 &0.06 &0.039\\ \hline E2 &0.014 &0.049 &0.007 &0.06 &0.022 &0.057 &0 &0.049 &0.058 &0.06 &0.055 &0.015 &0.058 &0.043 &0.047 &0.057\\ \hline E3 &0.049 &0.022 &0.017 &0.062 &0.029 &0.034 &0.036 &0 &0.042 &0.016 &0.043 &0.014 &0.06 &0.024 &0.029 &0.043\\ \hline F1 &0.059 &0.062 &0.045 &0.06 &0.06 &0.05 &0.057 &0.058 &0 &0.015 &0.014 &0.008 &0.014 &0.035 &0.014 &0.042\\ \hline F2 &0.007 &0.011 &0.001 &0.007 &0.008 &0.021 &0.024 &0.014 &0.011 &0 &0.054 &0.011 &0.01 &0.042 &0.017 &0.045\\ \hline F3 &0.031 &0.042 &0.007 &0.008 &0.017 &0.055 &0.056 &0.062 &0.017 &0.057 &0 &0.009 &0.01 &0.049 &0.053 &0.052\\ \hline U1 &0.049 &0.06 &0.049 &0.045 &0.01 &0.043 &0.022 &0.055 &0.032 &0.014 &0.028 &0 &0.058 &0.05 &0.039 &0.021\\ \hline U2 &0.049 &0.034 &0.042 &0.052 &0.035 &0.05 &0.048 &0.056 &0.045 &0.015 &0.014 &0.061 &0 &0.009 &0.004 &0.057\\ \hline D1 &0.014 &0.007 &0.025 &0.048 &0.045 &0.06 &0.048 &0.044 &0.016 &0.007 &0.057 &0.007 &0.045 &0 &0.053 &0.062\\ \hline D2 &0.042 &0.049 &0.008 &0.058 &0.048 &0.057 &0.028 &0.062 &0.06 &0.029 &0.023 &0.056 &0.035 &0.062 &0 &0.021\\ \hline D3 &0.008 &0.007 &0.006 &0.061 &0.015 &0.062 &0.057 &0.05 &0.006 &0.045 &0.05 &0.059 &0.022 &0.05 &0.062 &0\\ \hline \end{array} $$
综合影响矩阵求解过程 $$\begin{CD} N @>>>T \\ \end{CD} $$
综合影响矩阵如下
$T=\mathcal{N}(I-\mathcal{N})^{-1}$
$$T=\begin{array}{|c|c|c|c|c|c|c|}\hline {M_{16 \times16}} &C1 &C2 &C3 &C4 &C5 &E1 &E2 &E3 &F1 &F2 &F3 &U1 &U2 &D1 &D2 &D3\\ \hline C1 &0.054 &0.096 &0.085 &0.132 &0.1 &0.119 &0.108 &0.127 &0.126 &0.038 &0.049 &0.096 &0.123 &0.063 &0.1 &0.056\\ \hline C2 &0.1 &0.041 &0.065 &0.12 &0.104 &0.071 &0.066 &0.108 &0.113 &0.035 &0.067 &0.063 &0.087 &0.073 &0.074 &0.059\\ \hline C3 &0.092 &0.054 &0.028 &0.116 &0.062 &0.099 &0.05 &0.115 &0.108 &0.023 &0.033 &0.071 &0.095 &0.066 &0.086 &0.058\\ \hline C4 &0.09 &0.074 &0.043 &0.059 &0.1 &0.1 &0.061 &0.106 &0.107 &0.031 &0.046 &0.069 &0.108 &0.058 &0.083 &0.054\\ \hline C5 &0.07 &0.068 &0.054 &0.104 &0.041 &0.084 &0.074 &0.099 &0.108 &0.035 &0.046 &0.053 &0.106 &0.064 &0.081 &0.059\\ \hline E1 &0.053 &0.047 &0.031 &0.1 &0.055 &0.05 &0.083 &0.087 &0.104 &0.047 &0.062 &0.047 &0.102 &0.06 &0.097 &0.076\\ \hline E2 &0.062 &0.09 &0.037 &0.124 &0.07 &0.117 &0.053 &0.114 &0.113 &0.088 &0.095 &0.054 &0.112 &0.088 &0.097 &0.104\\ \hline E3 &0.087 &0.06 &0.044 &0.116 &0.069 &0.086 &0.079 &0.057 &0.091 &0.04 &0.074 &0.048 &0.105 &0.061 &0.072 &0.081\\ \hline F1 &0.102 &0.1 &0.073 &0.123 &0.103 &0.106 &0.102 &0.118 &0.059 &0.042 &0.051 &0.045 &0.072 &0.075 &0.065 &0.083\\ \hline F2 &0.026 &0.029 &0.013 &0.036 &0.027 &0.05 &0.049 &0.044 &0.034 &0.016 &0.073 &0.027 &0.035 &0.062 &0.043 &0.067\\ \hline F3 &0.066 &0.074 &0.03 &0.064 &0.055 &0.104 &0.096 &0.112 &0.064 &0.082 &0.037 &0.04 &0.057 &0.086 &0.095 &0.091\\ \hline U1 &0.093 &0.098 &0.078 &0.107 &0.056 &0.099 &0.068 &0.115 &0.087 &0.039 &0.062 &0.038 &0.11 &0.088 &0.084 &0.063\\ \hline U2 &0.092 &0.074 &0.071 &0.113 &0.076 &0.104 &0.093 &0.115 &0.098 &0.041 &0.049 &0.096 &0.055 &0.05 &0.053 &0.096\\ \hline D1 &0.053 &0.044 &0.048 &0.104 &0.082 &0.112 &0.091 &0.1 &0.066 &0.035 &0.089 &0.042 &0.093 &0.04 &0.097 &0.101\\ \hline D2 &0.09 &0.092 &0.041 &0.123 &0.096 &0.116 &0.079 &0.126 &0.117 &0.055 &0.063 &0.092 &0.094 &0.104 &0.052 &0.068\\ \hline D3 &0.048 &0.046 &0.031 &0.115 &0.054 &0.114 &0.099 &0.106 &0.057 &0.072 &0.086 &0.09 &0.074 &0.09 &0.106 &0.043\\ \hline \end{array} $$
区段截取的处理
$T$的相关统计数据求解
平均数,均值 $\bar{x}$
$\bar{x}= 0.075773026705071 $
总体标准差$\sigma=\sqrt { \frac {\sum \limits_{i=1}^{n^2} ({x_i-\bar{x}})^2 }{n^2} } $ ( $n$为要素的数目)
$\sigma = 0.027177542243905 $
样本标准差一:$S=\sqrt { \frac {\sum \limits_{i=1}^{n^2} ({x_i-\bar{x}})^2 }{n^2-1} }$ ( $n$为要素的数目)
$S = 0.027230779400201 $
样本标准差二:$ \bar {S}=\sqrt { \frac {\sum \limits_{i=1}^{n^2} ({x_i-\bar{x}})^2 }{n^2-n} } $ ( $n$为要素的数目)
$ \bar {S}= 0.028068844933731 $
标准误差 $\sigma_{s}= \frac {\sigma}{n }$ ( $n$为要素的数目)
$\sigma_{s}= 0.004735814169067 $
方差 $ {\sigma}^{2}= \sigma ^{2} $
$\sigma^{2}= 0.00073861880241922 $
选择的截距方式为:$\lambda= \bar{x}+ \sigma^{2}$
$\lambda=0.076511645507491 $
\begin{CD} T@>\lambda=0.076511645507491>> A \\ \end{CD}
$$ a_{ij}= \begin{cases} 1 , \text{ $e_i$}\rightarrow \text{$e_j$ 当: $ t_{ij} > \lambda=0.076511645507491 $} \\ 0, \text{ $e_i$}\rightarrow \text{$e_j$ 当: $ t_{ij} < \lambda=0.076511645507491 $} \end{cases} $$
$\lambda= 0.076511645507491$ 截取后的关系矩阵$ A$
$$ A=\begin{array}{c|c|c|c|c|c|c}{M_{16 \times16}} &C1 &C2 &C3 &C4 &C5 &E1 &E2 &E3 &F1 &F2 &F3 &U1 &U2 &D1 &D2 &D3\\ \hline C1 &0 &1 &1 &1 &1 &1 &1 &1 &1 &0 &0 &1 &1 &0 &1 &0\\ \hline C2 &1 &0 &0 &1 &1 &0 &0 &1 &1 &0 &0 &0 &1 &0 &0 &0\\ \hline C3 &1 &0 &0 &1 &0 &1 &0 &1 &1 &0 &0 &0 &1 &0 &1 &0\\ \hline C4 &1 &0 &0 &0 &1 &1 &0 &1 &1 &0 &0 &0 &1 &0 &1 &0\\ \hline C5 &0 &0 &0 &1 &0 &1 &0 &1 &1 &0 &0 &0 &1 &0 &1 &0\\ \hline E1 &0 &0 &0 &1 &0 &0 &1 &1 &1 &0 &0 &0 &1 &0 &1 &0\\ \hline E2 &0 &1 &0 &1 &0 &1 &0 &1 &1 &1 &1 &0 &1 &1 &1 &1\\ \hline E3 &1 &0 &0 &1 &0 &1 &1 &0 &1 &0 &0 &0 &1 &0 &0 &1\\ \hline F1 &1 &1 &0 &1 &1 &1 &1 &1 &0 &0 &0 &0 &0 &0 &0 &1\\ \hline F2 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0 &0\\ \hline F3 &0 &0 &0 &0 &0 &1 &1 &1 &0 &1 &0 &0 &0 &1 &1 &1\\ \hline U1 &1 &1 &1 &1 &0 &1 &0 &1 &1 &0 &0 &0 &1 &1 &1 &0\\ \hline U2 &1 &0 &0 &1 &0 &1 &1 &1 &1 &0 &0 &1 &0 &0 &0 &1\\ \hline D1 &0 &0 &0 &1 &1 &1 &1 &1 &0 &0 &1 &0 &1 &0 &1 &1\\ \hline D2 &1 &1 &0 &1 &1 &1 &1 &1 &1 &0 &0 &1 &1 &1 &0 &0\\ \hline D3 &0 &0 &0 &1 &0 &1 &1 &1 &0 &0 &1 &1 &0 &1 &1 &0\\ \hline \end{array} $$
