Mirror symmetry for 4d $A_1$ class-$\mathcal{S}$ theories: modularity, defects and Coulomb branch

TL;DR

This paper explores a 4d mirror symmetry for class-$ ext{S}$ theories, linking Higgs and Coulomb branch data through representation theory, Hitchin moduli spaces, and vertex operator algebras, with implications for understanding Argyres-Douglas theories.

Contribution

It provides a detailed analysis of 4d mirror symmetry for class-$ ext{S}$ theories, connecting Higgs and Coulomb branches via the 4d/VOA correspondence and Hitchin moduli spaces.

Findings

Matching of representation theory data with Hitchin moduli space fixed points

Extension of Higgs-Coulomb branch correspondence to Argyres-Douglas theories

Systematic approach for VOA representation theory using Hitchin systems

Abstract

This is the companion paper of the letter arXiv:2410.15695, containing all the details and series of examples on a 4d mirror symmetry for the class-$\mathcal{S}$ theories which relates the representation theory of the chiral quantization of the Higgs branch and the geometry of the Coulomb branch. We study the representation theory by using the 4d/VOA correspondence, (defect) Schur indices and (flavor) modular differential equations, and match the data with the fixed manifolds of the Hitchin moduli spaces. This correspondence extends the connection between Higgs and Coulomb branch of Argyres-Douglas theories, and can provide systematic guidance for the study of the representation theory of vertex operator algebras by exploiting results from Hitchin systems.