Line defect Schur indices, Verlinde algebras and U(1)r fixed points

Abstract

Given an N=2 superconformal field theory, we reconsider the Schur index IL(q) in the presence of a half line defect L. Recently Cordova-Gaiotto-Shao found that IL(q) admits an expansion in terms of characters of the chiral algebra A introduced by Beem et al., with simple coefficients vL,β(q). We report a puzzling new feature of this expansion: the q 1 limit of the coefficients vL,β(q) is linearly related to the vacuum expectation values L in U(1)r-invariant vacua of the theory compactified on S1. This relation can be expressed algebraically as a commutative diagram involving three algebras: the algebra generated by line defects, the algebra of functions on U(1)r-invariant vacua, and a Verlinde-like algebra associated to A. Our evidence is experimental, by direct computation in the Argyres-Douglas theories of type (A1,A2), (A1,A4), (A1, A6), (A1, D3) and (A1, D5). In the latter two theories, which have flavor symmetries, the Verlinde-like algebra which appears is a new deformation of algebras previously considered.