Generalized BPS magnetic monopoles in inhomogeneous Yang-Mills-Higgs models

TL;DR

This paper introduces a generalized non-Abelian magnetic monopole model in inhomogeneous media, analyzing BPS solutions with spatially dependent couplings, including exact, numerical, and diverse monopole configurations.

Contribution

It extends the standard 't Hooft-Polyakov model to inhomogeneous media with spatially varying couplings, providing analytical solutions along a specific parameter line and exploring a variety of monopole structures.

Findings

Exact monopole solutions on the line =1 with inhomogeneous backgrounds.

Numerical solutions for general parameter values showing diverse monopole configurations.

Identification of conditions for regular BPS monopoles in the generalized model.

Abstract

We present a non-Abelian model for magnetic monopoles in inhomogeneous media, based on a generalization of the standard 't~Hooft-Polyakov model. The medium is described by spatially dependent couplings in the gauge and scalar sectors, constrained by $P(|\Phi|,r)M(|\Phi|,r)=1$ so that the Bogomol'nyi-Prasad-Sommerfield (BPS) bound is preserved. For static spherically symmetric configurations, we study the first-order monopole equations for the class of generalized permeabilities $M(H,r)=f(r)/H^\alpha$. For the power-law profile $f(r)=r^\beta$, we determine the domain in the $(\alpha,\beta)$ plane where regular BPS solutions exist. On the line $\alpha=1$, the system becomes exactly integrable, with closed-form monopole solutions in an inhomogeneous background. Away from this analytical sector, the solutions are constructed numerically. The model supports a rich spectrum of configurations, including effectively point-like monopoles, compact-core monopoles, hollow monopoles, shell-like structures, and multi-shell monopoles characterized by multiple concentric peaks in the energy density.