Superconformal field theory and Jack superpolynomials
Abstract
We uncover a deep connection between the superconformal field theory in 2D and eigenfunctions of the supersymmetric Sutherland model known as Jack superpolynomials (sJacks). Specifically, the singular vector at level of the Kac module labeled by the two integers and are given explicitly as a sum of sJacks whose indexing diagrams are contained in a rectangle with columns and rows As a second compelling evidence for the distinguished status of the sJack-basis in SCFT, we find that the degenerate Whittaker vectors (Gaiotto states) can be expressed as a remarkably simple linear combination of sJacks. As a consequence, we are able to reformulate the supersymmetric version of the (degenerate) AGT conjecture in terms of the combinatorics of sJacks. Note that the closed-form formulas for the singular vectors and the degenerate Whittaker vectors, although only conjectured in general, have been heavily tested (in some cases, up to level 33/2). Note also that both the Neveu-Schwarz and Ramond sectors are treated.
Cite
@article{arxiv.1205.0784,
title = {Superconformal field theory and Jack superpolynomials},
author = {Patrick Desrosiers and Luc Lapointe and Pierre Mathieu},
journal= {arXiv preprint arXiv:1205.0784},
year = {2013}
}
Comments
37 pages. v3: correction of some equations (not corrected in the published version), most importantly, (6.9), (6.10), and (B.27)