Affiliation:
1. Durham University
2. University of Cambridge
Abstract
This paper studies 3d3d\mathcal{N}=4𝒩=4
supersymmetric gauge theories on an elliptic curve, with the aim to
provide a physical realisation of recent constructions in equivariant
elliptic cohomology of symplectic resolutions. We first study the Berry
connection for supersymmetric ground states in the presence of mass
parameters and flat connections for flavour symmetries, which results in
a natural construction of the equivariant elliptic cohomology variety of
the Higgs branch. We then investigate supersymmetric boundary conditions
and show from an analysis of boundary ’t Hooft anomalies that their
boundary amplitudes represent equivariant elliptic cohomology classes.
We analyse two distinguished classes of boundary conditions known as
exceptional Dirichlet and enriched Neumann, which are exchanged under
mirror symmetry. We show that the boundary amplitudes of the latter
reproduce elliptic stable envelopes introduced by Aganagic-Okounkov, and
relate boundary amplitudes of the mirror symmetry interface to the
mother function in equivariant elliptic cohomology. Finally, we consider
correlation functions of Janus interfaces for varying mass parameters,
recovering the chamber R-matrices of elliptic integrable systems.
Funder
Engineering and Physical Sciences Research Council
Science and Technology Facilities Council
Subject
General Physics and Astronomy
Cited by
10 articles.
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