Theory of holomorphic maps of two-dimensional complex manifolds to toric manifolds and type A multi-string theory

Abstract

We study the field theory localizing to holomorphic maps from a complex manifold of complex dimension 2 to a toric target (a generalization of A model). Fields are realized as maps to (C*)N where one includes special observables supported on (1,1)-dimensional submanifolds to produce maps to the toric compactification. We study the mirror of this model. It turns out to be a free theory interacting with Ncomp topological strings of type A. Here Ncomp is the number of compactifying divisors of the toric target. Before the mirror transformation these strings are vortex (actually, holomortex) strings.