Flag manifold sigma models from SU($n$) chains
Abstract
One dimensional SU() chains with the same irreducible representation at each site are considered. We determine which admit low-energy mappings to a flag manifold sigma model, and calculate the topological angles for such theories. Generically, these models will have fields with both linear and quadratic dispersion relations; for each , we determine how many fields of each dispersion type there are. Finally, for purely linearly-dispersing theories, we list the irreducible representations that also possess a symmetry that acts transitively on the fields. Such SU() chains have an 't Hooft anomaly in certain cases, allowing for a generalization of Haldane's conjecture to these novel representations. In particular, for even and for representations whose Young tableaux have two rows, of lengths and satisfying , we predict a gapless ground state when is coprime with . Otherwise, we predict a gapped ground state that necessarily has spontaneously broken symmetry if is not a multiple of .
Cite
@article{arxiv.2007.01912,
title = {Flag manifold sigma models from SU($n$) chains},
author = {Kyle Wamer and Ian Affleck},
journal= {arXiv preprint arXiv:2007.01912},
year = {2020}
}
Comments
26 pages + 9 pages of appendices