A new determinant for the $Q$-enumeration of alternating sign matrices

TL;DR

This paper proves a new determinant formula for alternating sign matrices involving a parameter q, generalizes enumeration formulas, and connects to tiling problems, providing new proofs and factorization results.

Contribution

It introduces a q-parameterized determinant formula for alternating sign matrices and proves related conjectures, extending enumeration results and linking to tiling problems.

Findings

Proved that Fischer's determinant formula corresponds to the (2+q+q^{-1})-enumeration.

Established a product formula for the generalized determinant in specific enumeration cases.

Connected the 1-enumeration to cyclically symmetric lozenge tilings and classical determinant evaluations.

Abstract

Fischer provided a new type of binomial determinant for the number of alternating sign matrices involving the third root of unity. In this paper we prove that her formula, when replacing the third root of unity by an indeterminate $q$, is actually the $(2+q+q^{-1})$-enumeration of alternating sign matrices. By evaluating a generalisation of this determinant we are able to reprove a conjecture of Mills, Robbins and Rumsey stating that the $Q$-enumeration is a product of two polynomials in $Q$. Further we provide a closed product formula for the generalised determinant in the 0-,1- 2- and 3-enumeration case, leading to a new proof of the $1$-,$2$- and $3$-enumeration of alternating sign matrices, and a factorisation in the $4$-enumeration case. Finally we relate the $1$-enumeration of our generalised determinant to the determinant evaluations of Ciucu, Eisenk\"olbl, Krattenthaler and Zare, which counts weighted cyclically symmetric lozenge tilings of a hexagon with a triangular hole and is a generalisation of a famous result by Andrews.