Litcius/Paper detail

Testing Macdonald index as a refined character of chiral algebra

Akimi Watanabe, Rui-Dong Zhu

2020Journal of High Energy Physics10 citationsDOIOpen Access PDF

Abstract

A bstract We test in ( A n −1 , A m −1 ) Argyres-Douglas theories with gcd( n , m ) = 1 the proposal of Song’s in [1] that the Macdonald index gives a refined character of the dual chiral algebra. In particular, we extend the analysis to higher rank theories and Macdonald indices with surface operator, via the TQFT picture and Gaiotto-Rastelli-Razamat’s Higgsing method. We establish the prescription for refined characters in higher rank minimal models from the dual ( A n −1 , A m −1 ) theories in the large m limit, and then provide evidence for Song’s proposal to hold (at least) in some simple modules (including the vacuum module) at finite m. We also discuss some observed mismatch in our approach for surface operators with large vortex number.

Topics & Concepts

PhysicsCharacter (mathematics)Rank (graph theory)Simple (philosophy)Surface (topology)Simple modulePure mathematicsTopological quantum field theoryDual (grammatical number)Type (biology)Theoretical physicsAlgebra over a fieldQuiverMinimal modelsVariety (cybernetics)Vacuum stateIndex (typography)Quantum field theoryConnection (principal bundle)Representation theoryWilson loopMinimal modelAlgebraic structures and combinatorial modelsBlack Holes and Theoretical PhysicsHomotopy and Cohomology in Algebraic Topology