Open AccessA probabilistic interpretation of the Macdonald polynomials
Author(s) -
Persi Diaconis,
Arun Ram
Publication year - 2012
Publication title -
the annals of probability
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 3.184
H-Index - 98
eISSN - 2168-894X
pISSN - 0091-1798
DOI - 10.1214/11-aop674
Subject(s) - mathematics , markov chain , macdonald polynomials , orthogonal polynomials , difference polynomials , discrete orthogonal polynomials , combinatorics , classical orthogonal polynomials , bounded function , interpretation (philosophy) , pure mathematics , discrete mathematics , mathematical analysis , statistics , computer science , programming language
The two-parameter Macdonald polynomials are a central object of algebraic combinatorics and representation theory. We give a Markov chain on partitions of k with eigenfunctions the coefficients of the Macdonald polynomials when expanded in the power sum polynomials. The Markov chain has stationary distribution a new two-parameter family of measures on partitions, the inverse of the Macdonald weight (rescaled). The uniform distribution on cycles of permutations and the Ewens sampling formula are special cases. The Markov chain is a version of the auxiliary variables algorithm of statistical physics. Properties of the Macdonald polynomials allow a sharp analysis of the running time. In natural cases, a bounded number of steps suffice for arbitrarily large k.
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