q RSt: A probabilistic Robinson--Schensted correspondence for Macdonald polynomials

Abstract

We present a probabilistic generalization of the Robinson--Schensted correspondence in which a permutation maps to several different pairs of standard Young tableaux with nonzero probability. The probabilities depend on two parameters q and t, and the correspondence gives a new proof of the squarefree part of the Cauchy identity for Macdonald polynomials (i.e., the equality of the coefficients of x1 ·s xn y1 ·s yn on either side, which are related to permutations and standard Young tableaux). By specializing q and t in various ways, one recovers the row and column insertion versions of the Robinson--Schensted correspondence, several q- and t-deformations of row and column insertion which have been introduced in recent years in connection with q-Whittaker and Hall--Littlewood processes, and the Plancherel measure on partitions. Our construction is based on Fomin's growth diagrams and the recently introduced notion of a probabilistic bijection between weighted sets.