FQHE and $tt^{*}$ geometry
Abstract
Cumrun Vafa has proposed a microscopic description of the Fractional Quantum Hall Effect (FQHE) in terms of a many-body Hamiltonian invariant under four supersymmetries. The non-Abelian statistics of the defects (quasi-holes and quasi-particles) is then determined by the monodromy representation of the associated geometry. In this paper we study the monodromy representation of the Vafa 4-susy model. Modulo some plausible assumption, we find that the monodromy representation factors through a Temperley-Lieb/Hecke algebra with . The emerging picture agrees with the other Vafa's predictions as well. The bulk of the paper is dedicated to the development of new concepts, ideas, and techniques in geometry which are of independent interest. We present several examples of these geometric structures in various contexts.
Cite
@article{arxiv.1910.05022,
title = {FQHE and $tt^{*}$ geometry},
author = {Riccardo Bergamin and Sergio Cecotti},
journal= {arXiv preprint arXiv:1910.05022},
year = {2020}
}