Solitons in the Higgs phase -- the moduli matrix approach --

TL;DR

This paper reviews the moduli matrix approach to classifying and analyzing solitons like domain walls, vortices, monopoles, and instantons in Higgs phase gauge theories, providing new insights into their moduli spaces and interactions.

Contribution

It introduces the moduli matrix as a comprehensive tool for characterizing all BPS soliton solutions and their moduli spaces in Higgs phase gauge theories, extending previous methods.

Findings

Moduli matrix exhaustively characterizes BPS solitons.

Explicit moduli spaces for walls, vortices, and composite solitons are derived.

New results on soliton interactions and effective Lagrangians are presented.

Abstract

We review our recent work on solitons in the Higgs phase. We use U(N_C) gauge theory with N_F Higgs scalar fields in the fundamental representation, which can be extended to possess eight supercharges. We propose the moduli matrix as a fundamental tool to exhaust all BPS solutions, and to characterize all possible moduli parameters. Moduli spaces of domain walls (kinks) and vortices, which are the only elementary solitons in the Higgs phase, are found in terms of the moduli matrix. Stable monopoles and instantons can exist in the Higgs phase if they are attached by vortices to form composite solitons. The moduli spaces of these composite solitons are also worked out in terms of the moduli matrix. Webs of walls can also be formed with characteristic difference between Abelian and non-Abelian gauge theories. We characterize the total moduli space of these elementary as well as composite solitons. Effective Lagrangians are constructed on walls and vortices in a compact form. We also present several new results on interactions of various solitons, such as monopoles, vortices, and walls. Review parts contain our works on domain walls (hep-th/0404198, hep-th/0405194, hep-th/0412024, hep-th/0503033, hep-th/0505136), vortices (hep-th/0511088, hep-th/0601181), domain wall webs (hep-th/0506135, hep-th/0508241, hep-th/0509127), monopole-vortex-wall systems (hep-th/0405129, hep-th/0501207), instanton-vortex systems (hep-th/0412048), effective Lagrangian on walls and vortices (hep-th/0602289), classification of BPS equations (hep-th/0506257), and Skyrmions (hep-th/0508130).