Closed form fermionic expressions for the Macdonald index

Abstract

We interpret aspects of the Schur indices, that were identified with characters of highest weight modules in Virasoro (p,p')=(2,2k+3) minimal models for k=1,2,…, in terms of paths that first appeared in exact solutions in statistical mechanics. From that, we propose closed-form fermionic sum expressions, that is, q, t-series with manifestly non-negative coefficients, for two infinite-series of Macdonald indices of (A1,A2k) Argyres-Douglas theories that correspond to t-refinements of Virasoro (p,p')=(2,2k+3) minimal model characters, and two rank-2 Macdonald indices that correspond to t-refinements of W3 non-unitary minimal model characters. Our proposals match with computations from 4D N = 2 gauge theories via the TQFT picture, based on the work of J Song arXiv:1509.06730.