From Phase Space to Integrable Representations and Level-Rank Duality
Abstract
We explicitly find representations for different large phases of Chern-Simons matter theory on . These representations are characterised by Young diagrams. We show that no-gap and lower-gap phase of Chern-Simons-matter theory correspond to integrable representations of affine Lie algebra, where as upper-cap phase corresponds to integrable representations of affine Lie algebra. We use phase space description of arXiv:0711.0133 to obtain these representations and argue how putting a cap on eigenvalue distribution forces corresponding representations to be integrable. We also prove that the Young diagrams corresponding to lower-gap and upper-cap representations are related to each other by transposition under level-rank duality. Finally we draw phase space droplets for these phases and show how information about eigenvalue and Young diagram descriptions can be captured in topologies of these droplets in a unified way.
Keywords
Cite
@article{arxiv.1801.07901,
title = {From Phase Space to Integrable Representations and Level-Rank Duality},
author = {Arghya Chattopadhyay and Parikshit Dutta and Suvankar Dutta},
journal= {arXiv preprint arXiv:1801.07901},
year = {2018}
}
Comments
37 pages, 10 figures, v2 Introduction extended, References added