Modular functors, cohomological field theories and topological recursion

Abstract

Given a topological modular functor V in the sense of Walker Walker, we construct vector bundles over Mg,n, whose Chern classes define semi-simple cohomological field theories. This construction depends on a determination of the logarithm of the eigenvalues of the Dehn twist and central element actions. We show that the intersection of the Chern class with the -classes in Mg,n is computed by the topological recursion of EOFg, for a local spectral curve that we describe. In particular, we show how the Verlinde formula for the dimensions Dλ(g,n) = Vλ(g,n) is retrieved from the topological recursion. We analyze the consequences of our result on two examples: modular functors associated to a finite group G (for which Dλ(g,n) enumerates certain G-principle bundles over a genus g surface with n boundary conditions specified by λ), and the modular functor obtained from Wess-Zumino-Witten conformal field theory associated to a simple, simply-connected Lie group G (for which Vλ(g,n) is the Verlinde bundle).