An exact formula for U(3) Vafa-Witten invariants on P2
Abstract
Topologically twisted N = 4 super Yang-Mills theory has a partition function that counts Euler numbers of instanton moduli spaces. On the manifold P2 and with gauge group U(3) this partition function has a holomorphic anomaly which makes it a mock modular form of depth two. We employ the Circle Method to find a Rademacher expansion for the Fourier coefficients of this partition function. This is the first example of the use of Circle Method for a mock modular form of a higher depth.
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