Cardy limit of the 3d superconformal index

Abstract

We study the superconformal index Z(q) of 3d N=2 gauge theories in Cardy-like limits β= 1q 0+, extending techniques recently developed in the 4d N=1 context. For theories with vectorlike matter content we find on the first sheet (q 1) that Z(q) β-\#, where the exponent \# is determined by a multiscale\ decomposition of the BPS moduli space appearing in the localization formula for the index. On the second sheet (q e2πi) we find Z(q) e\#/ β, and that the long-standing puzzle of apparent gauge-enhancing saddles is resolved (in the absence of Chern--Simons couplings) via a novel Lorentzian\ factorization formula that establishes complete screening. A key insight is the use of Poisson\ resummation, which streamlines the asymptotic analysis, sharpens the link to Kaluza--Klein effective field theory, and provides a dual description of parts of the BPS moduli space in terms of punctured surfaces. The Lorentzian factorization formula also emerges from Poisson resummation, though applied after a contour crossing in moduli space. This, in turn, hints at a correspondence between 3d monopoles and vortices via 2d duality.