Journal of High Energy Physics (Jun 2020)
Closed form fermionic expressions for the Macdonald index
Abstract
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 (A 1 , A 2k ) 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 W 3 $$ {\mathcal{W}}_3 $$ non-unitary minimal model characters. Our proposals match with computations from 4d N $$ \mathcal{N} $$ = 2 gauge theories via the TQFT picture, based on the work of J Song [75].
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