't Hooft anomalies and the holomorphy of supersymmetric partition functions

Abstract

We study the dependence of supersymmetric partition functions on continuous parameters for the flavor symmetry group, GF, for 2d N = (0,2) and 4d N=1 supersymmetric quantum field theories. In any diffeomorphism-invariant scheme and in the presence of GF 't Hooft anomalies, the supersymmetric Ward identities imply that the partition function has a non-holomorphic dependence on the flavor parameters. We show this explicitly for the 2d torus partition function, ZT2, and for a large class of 4d partition functions on half-BPS four-manifolds, ZM4---in particular, for M4=S3 × S1 and M4=g × T2. We propose a new expression for ZMd-1 × S1, which differs from earlier holomorphic results by the introduction of a non-holomorphic `Casimir' pre-factor. The latter is fixed by studying the `high temperature' limit of the partition function. Our proposal agrees with the supersymmetric Ward identities, and with explicit calculations of the absolute value of the partition function using a gauge-invariant zeta-function regularization.