Orbifold melting crystal models and reductions of Toda hierarchy

Abstract

Orbifold generalizations of the ordinary and modified melting crystal models are introduced. They are labelled by a pair a,b of positive integers, and geometrically related to Za×Zb orbifolds of local CP1 geometry of the O(0)(-2) and O(-1)(-1) types. The partition functions have a fermionic expression in terms of charged free fermions. With the aid of shift symmetries in a fermionic realization of the quantum torus algebra, one can convert these partition functions to tau functions of the 2D Toda hierarchy. The powers La,L-b of the associated Lax operators turn out to take a special factorized form that defines a reduction of the 2D Toda hierarchy. The reduced integrable hierarchy for the orbifold version of the ordinary melting crystal model is the bi-graded Toda hierarchy of bi-degree (a,b). That of the orbifold version of the modified melting crystal model is the rational reduction of bi-degree (a,b). This result seems to be in accord with recent work of Brini et al. on a mirror description of the genus-zero Gromov-Witten theory on a Za×Zb orbifold of the resolved conifold.