Vafa-Witten invariants from wall-crossing for framed sheaves

Abstract

We consider the refined SU(r) Vafa-Witten partition function of a smooth projective surface with non-zero holomorphic 2-form. This partition function has a vertical contribution, expressible in terms of nested Hilbert schemes. First, we write the vertical contribution in terms of y-genera of moduli spaces of framed sheaves on P2. Then, we state two wall-crossing identities for moduli spaces of framed sheaves: a blow-up formula due to Kuhn-Leigh-Tanaka and a new stable/co-stable wall-crossing formula. We prove the latter using the theory of mixed Hodge modules. We apply these identities to obtain constraints on Vafa-Witten invariants predicted by conjectures of G\"ottsche and the second- and third-named authors. For r=2, we obtain a proof of the vertical part of a celebrated formula by Vafa-Witten.