Index from a point

Abstract

We propose an algebro-geometric interpretation of the Schur and Macdonald indices of four-dimensional N=2 superconformal field theories (SCFTs). We conjecture that there exists an affine scheme X, which reduces to the Higgs branch as a variety, such that the Hilbert series of the (appropriately-graded) arc space of its polynomial ring J∞(C[X]) encodes the indices. Distinct local descriptions of a (singular) point correspond to distinct choices of X, giving rise to families of N=2 SCFTs each without a Higgs branch. These local descriptions directly translate into nilpotency relations in the operator product expansions. We test our conjecture across a variety of (generalized) Argyres--Douglas theories.