Twisted Partition Functions and H-Saddles

Abstract

While studying supersymmetric G-gauge theories, one often observes that a zero-radius limit of the twisted partition function G is computed by the partition function ZG in one less dimensions. We show that this type of identification fails generically due to integrations over Wilson lines. Tracing the problem, physically, to saddles with reduced effective theories, we relate G to a sum of distinct ZH's and classify the latter, dubbed H-saddles. This explains why, in the context of pure Yang-Mills quantum mechanics, earlier estimates of the matrix integrals ZG had failed to capture the recently constructed bulk index IG bulk. The purported agreement between 4d and 5d instanton partition functions, despite such subtleties also present in the ADHM data, is explained.