Topological terms in Composite Higgs Models
Abstract
We apply a recent classification of topological action terms to Composite Higgs models based on a variety of coset spaces and discuss their phenomenology. The topological terms, which can all be obtained by integrating (possibly only locally-defined) differential forms, come in one of two types, with substantially differing consequences for phenomenology. The first type of term (which appears in the minimal model based on ) is a field theory generalization of the Aharonov-Bohm phase in quantum mechanics. The phenomenological effects of such a term arise only at the non-perturbative level, and lead to and violation in the Higgs sector. The second type of term (which appears in the model based on ) is a field theory generalization of the Dirac monopole in quantum mechanics and has physical effects even at the classical level. Perhaps most importantly, measuring the coefficient of such a term can allow one to probe the structure of the underlying microscopic theory. A particularly rich topological structure, with 6 distinct terms, is uncovered for the model based on , containing 2 Higgs doublets and a singlet. Of the corresponding couplings, one is an integer and one is a phase.
Cite
@article{arxiv.1808.04154,
title = {Topological terms in Composite Higgs Models},
author = {Joe Davighi and Ben Gripaios},
journal= {arXiv preprint arXiv:1808.04154},
year = {2018}
}
Comments
26 pages. Version accepted for publication in JHEP