Domino Tilings, Domino Shuffling, and the Nabla Operator

Abstract

We study domino tilings of certain regions Rλ, indexed by partitions λ, weighted according to generalized area and dinv statistics. These statistics arise from the q,t-Catalan combinatorics and Macdonald polynomials. We present a formula for the generating polynomial of these domino tilings in terms of the Bergeron--Garsia nabla operator. When λ = (nn) is a square shape, domino tilings of Rλ are equivalent to those of the Aztec diamond of order n. In this case, we give a new product formula for the resulting polynomials by domino shuffling and its connection with alternating sign matrices. In particular, we obtain a combinatorial proof of the joint symmetry of the generalized area and dinv statistics.