Duality theorems for \'etale gerbes on orbifolds

Abstract

Let G be a finite group and a G-gerbe over an orbifold . A disconnected orbifold and a flat U(1)-gerbe c on is canonically constructed from . Motivated by a proposal in physics, we study a mathematical duality between the geometry of the G-gerbe and the geometry of twisted by c. We prove several results verifying this duality in the contexts of noncommutative geometry and symplectic topology. In particular, we prove that the category of sheaves on is equivalent to the category of c-twisted sheaves on . When is symplectic, we show, by a combination of techniques from noncommutative geometry and symplectic topology, that the Chen-Ruan orbifold cohomology of is isomorphic to the c-twisted orbifold cohomology of as graded algebras.