Decorated square paths at q=-1

Abstract

The valley Delta square conjecture states that the symmetric function [n-k]q[n]qen-kω(pn) can be expressed as the enumerator of a certain class of decorated square paths with respect to the bistatistic (dinv,area). Inspired by recent positivity results of Corteel, Josuat-Verg\`es, and Vanden Wyngaerd, we study the evaluation of this enumerator at q=-1. By considering a cyclic group action on the decorated square paths which we call cutting and pasting, we show that . [n-k]q[n]qen-kω(pn), h1n|q=-1 is 0 whenever n-k is even, and is a positive polynomial related to the Euler numbers when n-k is odd. We also show that the combinatorics of this enumerator is closely connected to that of the Dyck path enumerator for en-k-1'en,h1n considered by Corteel-Josuat Verg\`es-Vanden Wyngaerd.