【问题标题】:Constructing a multi-order Markov chain transition matrix in Matlab在Matlab中构造一个多阶马尔可夫链转移矩阵
【发布时间】:2012-06-17 14:51:10
【问题描述】:

6个状态的一阶转移矩阵可以是constructed very elegantly as跟随

 x = [1 6 1 6 4 4 4 3 1 2 2 3 4 5 4 5 2 6 2 6 2 6]; % the Markov chain
 tm = full(sparse(x(1:end-1),x(2:end),1)) % the transition matrix.

所以这是我的问题,如何优雅地构造二阶转换矩阵? 我想出的解决方案如下

 [si sj] = ndgrid(1:6);
 s2 = [si(:) sj(:)]; % combinations for 2 contiguous states
 tm2 = zeros([numel(si),6]); % initialize transition matrix
 for i = 3:numel(x) % construct transition matrix
   tm2(strmatch(num2str(x(i-2:i-1)),num2str(s2)),x(i))=...
   tm2(strmatch(num2str(x(i-2:i-1)),num2str(s2)),x(i))+1;
 end

是否有单线/两线、无循环替代方案?

--

编辑: 我尝试将我的解决方案与 Amro 的解决方案与“x=round(5*rand([1,1000])+1);”进行比较

 % ted teng's solution
 Elapsed time is 2.225573 seconds.
 % Amro's solution
 Elapsed time is 0.042369 seconds. 

有什么不同! 仅供参考,grp2idx 可在线获取。

【问题讨论】:

    标签: matlab matrix transition probability markov-chains


    【解决方案1】:

    尝试以下方法:

    %# sequence of states
    x = [1 6 1 6 4 4 4 3 1 2 2 3 4 5 4 5 2 6 2 6 2 6];
    N = max(x);
    
    %# extract contiguous sequences of 2 items from the above
    bigrams = cellstr(num2str( [x(1:end-2);x(2:end-1)]' ));
    
    %# all possible combinations of two symbols
    [X,Y] = ndgrid(1:N,1:N);
    xy = cellstr(num2str([X(:),Y(:)]));
    
    %# map bigrams to numbers starting from 1
    [g,gn] = grp2idx([xy;bigrams]);
    s1 = g(N*N+1:end);
    
    %# items following the bigrams
    s2 = x(3:end);
    
    %# transition matrix
    tm = full( sparse(s1,s2,1,N*N,N) );
    spy(tm)
    

    【讨论】:

    • 先生,您是 Matlab @ Stack Exchange 的王者。即使在星期天!
    • @tedteng: 哈哈谢谢 :) GRP2IDX 函数是统计工具箱的一部分,但你可以用 UNIQUE 替换该调用:[gn,~,g] = unique([xy;bigrams], 'stable');
    • 将这种方法扩展到二维 x 是否容易?
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