Relative volume of comparable pairs under semigroup majorization

Abstract

Any semigroup S of stochastic matrices induces a semigroup majorization relation S on the set n-1 of probability n-vectors. Pick X,Y at random in n-1: what is the probability that X and Y are comparable under S? We review recent asymptotic (n∞) results and conjectures in the case of majorization relation (when S is the set of doubly stochastic matrices), discuss natural generalisations, and prove a new asymptotic result in the case of majorization, and new exact finite-n formulae in the case of UT-majorization relation, i.e. when S is the set of upper-triangular stochastic matrices.

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