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author | Daniele Nicolodi <nicolodi@science.unitn.it> |
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date | Mon, 05 Dec 2011 16:20:06 +0100 |
parents | f0afece42f48 |
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% CRANK calculate ranks for Spearman correlation %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % Given the data series w % Calculate: % rw: the ranks (ties are treated by midranking) % s: the sum(fk^3 - fk), where fk are the number of kth group of ties % % References: % [1] W. H. Press, S. A. Teukolsky, W. T. Vetterling, B. P. Flannery, % Numerical Recipes 3rd Edition: The Art of Scientific Computing, % Cambridge University Press; 3 edition (September 10, 2007) % % % L Ferraioli 06-12-2010 % % $Id: crank.m,v 1.1 2011/03/07 10:46:53 luigi Exp $ %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% function [rw,s] = crank(w) [sw,idx] = sort(w); n = numel(sw); s = 0; jj = 2; while jj < n+1 if sw(jj) ~= sw(jj-1); sw(jj-1) = jj-1; jj = jj+1; else jt = jj+1; while jt<=n+1 && sw(jt-1)==sw(jj-1) jt = jt + 1; end rnk = 0.5*(jj+jt-3); for ji=jj:jt-1 sw(ji-1)=rnk; end t = jt-jj; s = s + (t*t*t-t); jj = jt; end end if jj==n+1 sw(n)=n+1; end rw = zeros(size(sw)); for ii=1:numel(sw) rw(idx(ii)) = sw(ii); end end