q-Whittaker functions, finite fields, and Jordan forms
Abstract
The q-Whittaker function Wλ(x;q) associated to a partition λ is a q-analogue of the Schur function sλ(x), and is defined as the t=0 specialization of the Macdonald polynomial Pλ(x;q,t). We show combinatorially how to expand Wλ(x;q) in terms of partial flags compatible with a nilpotent endomorphism over the finite field of size 1/q. This yields an expression analogous to a well-known formula for the Hall-Littlewood functions. We show that considering pairs of partial flags and taking Jordan forms leads to a probabilistic bijection between nonnegative-integer matrices and pairs of semistandard tableaux of the same shape, proving the Cauchy identity for q-Whittaker functions. We call our probabilistic bijection the q-Burge correspondence, and prove that in the limit as q 0, we recover a description of the classical Burge correspondence (also known as column RSK) due to Rosso (2012). A key step in the proof is the enumeration of an arbitrary double coset of GLn modulo two parabolic subgroups, which we find to be of independent interest. As an application, we use the q-Burge correspondence to count isomorphism classes of certain modules over the preprojective algebra of a type A quiver (i.e. a path), refined according to their socle filtrations. This develops a connection between the combinatorics of symmetric functions and the representation theory of preprojective algebras.
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