SU(N) q-Toda equations from mass deformed ABJM theory

Abstract

It is known that the partition functions of the U(N) x U(N+M) ABJM theory satisfy a set of bilinear relations, which, written in the grand partition function, was recently found to be the q-Painleve III3 equation. In this paper we have suggested a similar bilinear relation holds for the ABJM theory with N=6 preserving mass deformation for an arbitrary complex value of mass parameter, to which we have provided several non-trivial checks by using the exact values of the partition functions for various N,k,M and the mass parameter. For particular choices of the mass parameters labeled by integers ,a as m1=m2=-π i(-2a)/, the bilinear relation corresponds to the q-deformation of the affine SU() Toda equation in τ-form.