Topological-Holomorphic N =4 Gauge Theory: From Langlands Duality of Holomorphic Invariants to Mirror Symmetry of Quasi-topological Strings

Abstract

We perform a topological-holomorphic twist of N=4 supersymmetric gauge theory on a four-manifold of the form M4=1 × 2 with Riemann surfaces 1,2, and unravel the mathematical implications of its physics. In particular, we consider different linear combinations of the resulting scalar supercharges under S-duality, where this will allow us to derive novel topological and holomorphic invariants of M4 and their Langlands duals. As the twisted theory can be topological along 1 whence we can dimensionally reduce it to 2d, via the effective sigma-model on 2, we can also relate these 4d invariants and their Langlands duals to the mirror symmetry of Higgs bundles and that of quasi-topological strings described by the sheaf of chiral differential operators. As an offshoot, we would be able to obtain a fundamental understanding from 4d gauge theory, why chiral differential operators are purely perturbative objects.