M2-branes and q-Painlev\'e equations

Abstract

In this paper we investigate a novel connection between the effective theory of M2-branes on (C2/Z2× C2/Z2)/Zk and the q-deformed Painlev\'e equations, by proposing that the grand canonical partition function of the corresponding four-nodes circular quiver N=4 Chern-Simons matter theory solves the q-Painlev\'e VI equation. We analyse how this describes the moduli space of the topological string on local dP5 and, via geometric engineering, five dimensional Nf=4 SU(2) N=1 gauge theory on a circle. The results we find extend the known relation between ABJM theory, q-Painlev\'e III3, and topological strings on local P1× P1. From the mathematical viewpoint the quiver Chern-Simons theory provides a conjectural Fredholm determinant realisation of the q-Painlev\'e VI τ-function. We provide evidence for this proposal by analytic and numerical checks and discuss in detail the successive decoupling limits down to Nf=0, corresponding to q-Painlev\'e\,\,III3.