Topological string amplitudes and Seiberg-Witten prepotentials from the counting of dimers in transverse flux

Abstract

Important illustration to the principle ``partition functions in string theory are τ-functions of integrable equations'' is the fact that the (dual) partition functions of 4d N=2 gauge theories solve Painlev\'e equations. In this paper we show a road to self-consistent proof of the recently suggested generalization of this correspondence: partition functions of topological string on local Calabi-Yau manifolds solve q-difference equations of non-autonomous dynamics of the ``cluster-algebraic'' integrable systems. We explain in details the ``solutions'' side of the proposal. In the simplest non-trivial example we show how 3d box-counting of topological string partition function appears from the counting of dimers on bipartite graph with the discrete gauge field of ``flux'' q. This is a new form of topological string/spectral theory type correspondence, since the partition function of dimers can be computed as determinant of the linear q-difference Kasteleyn operator. Using WKB method in the ``melting'' q 1 limit we get a closed integral formula for Seiberg-Witten prepotential of the corresponding 5d gauge theory. The ``equations'' side of the correspondence remains the intriguing topic for the further studies.