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Here is a profile of the call n = 2*10^3; M = DStochMat02(n,ones(n)./n);

 time   calls  line
                  1 function M = DStochMat02(n,c)
                  2 % Generate a random doubly stochastic matrix using
                  3 % Theorem (Birkhoff [1946], von Neumann [1953])
                  4 % Any doubly stochastic matrix M can be written as a convex combination
                  5 % of permutation matrices P1,...,Pk (i.e. M = c1*P1+...+ ck*Pk
                  6 % for nonnegative c1,...,ck with c1+...+ck = 1).
                  7 % Complexity: O(n^2)
                  8 % USE: M = DStochMat02(4,[1/2 1/8 1/8 1/4])
                  9 % Derek O'Connor, Oct 2006, Nov 2012. derekroconnor@eircom.net
  0.02       1   10 M = zeros(n,n);
< 0.01       1   11 I = eye(n);
< 0.01       1   12 for k = 1:n
   1.64   2000   13     pidx = GRPdur(n);                                 % Random Permutation
 107.72   2000   14     P = I(pidx,:);                                    % Random P matrix
  41.09   2000   15     M = M + c(k)*P;
< 0.01    2000   16 end


function p = GRPdur(n)
% -------------------------------------------------------------
% Generate a random permutation p(1:n) using Durstenfeld's
% Shuffle Algorithm, CACM, 1964.
% See Knuth, Section 3.4.2, TAOCP, Vol 2, 3rd Ed.
% Complexity: O(n)
% USE: p = GRPdur(10^7);
% Derek O'Connor, 8 Dec 2010.  derekroconnor@eircom.net
% -------------------------------------------------------------

    p = 1:n;                  % Start with Identity permutation
for k = n:-1:2
    r = 1+floor(rand*k);      % random integer between 1 and k
    t    = p(k);
    p(k) = p(r);               % Swap(p(r),p(k)).
    p(r) = t;
end
return % GRPdur
share|improve this question
    
why not use standard function randperm instead of GRPdur? –  max taldykin Nov 17 '12 at 9:27
    
@max taldykin Because the old randperm was (is) inefficient of time and space. The latest versions of Matlab use their implementation of Durstenfeld's algorithm, which is optimal in time and space –  Derek O'Connor Nov 17 '12 at 9:53

1 Answer 1

up vote 1 down vote accepted

How about changing lines 14 and 15 to the following lines:

l = ( [ pidx ; 1:n ] - 1 ) * [1;n] + 1; % convert pairs (pidx,1:n) to linear indices
M(l) = M(l) + c(k);

since P is very sparse, maybe it would be more efficient to increment only the non-zeros of P.

share|improve this answer
1  
Spot on! This is excellent and is the same as the method given by Matt Fighere: mathworks.co.uk/matlabcentral/answers/… It is up to 300 times faster than my matlab function. –  Derek O'Connor Dec 2 '12 at 17:06
    
@DerekO'Connor i haven't seen the mathworks solution - good to know my matlab is up-to-date. Thanks! –  Shai Dec 2 '12 at 18:38

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