On the existence of dyons and dyonic black holes in Einstein-Yang-Mills theory

TL;DR

This paper proves the existence of non-trivial dyonic soliton and black hole solutions in Einstein-Yang-Mills theory with anti-de Sitter asymptotics, highlighting potential stability of these solutions.

Contribution

It establishes the existence of new dyonic solutions near trivial ones using a non-linear perturbation approach and the implicit function theorem.

Findings

Existence of non-trivial dyonic soliton solutions.

Existence of non-trivial dyonic black hole solutions.

Magnetic gauge field functions have no zeros in these solutions.

Abstract

We study dyonic soliton and black hole solutions of the ${\mathfrak {su}}(2)$ Einstein-Yang-Mills equations in asymptotically anti-de Sitter space. We prove the existence of non-trivial dyonic soliton and black hole solutions in a neighbourhood of the trivial solution. For these solutions the magnetic gauge field function has no zeros and we conjecture that at least some of these non-trivial solutions will be stable. The global existence proof uses local existence results and a non-linear perturbation argument based on the (Banach space) implicit function theorem.