Analytic continuation of dimensions in supersymmetric localization

Abstract

We compute the perturbative partition functions for gauge theories with eight supersymmetries on spheres of dimension d5, proving a conjecture by the second author. We apply similar methods to gauge theories with four supersymmetries on spheres with d3. The results are valid for non-integer d as well. We further propose an analytic continuation from d=3 to d=4 that gives the perturbative partition function for an N=1 gauge theory. The results are consistent with the free multiplets and the one-loop β-functions for general N=1 gauge theories. We also consider the analytic continuation of an N=1-preserving mass deformation of the maximally supersymmetric gauge theory and compare to recent holographic results for N=1* super Yang-Mills. We find that the general structure for the real part of the free energy coming from the analytic continuation is consistent with the holographic results.