TL;DR
This paper constructs new five-dimensional rotating black ring solutions on Taub-NUT space using inverse-scattering, extending known black ring solutions to include a Taub-NUT background and analyzing their properties.
Contribution
It introduces a novel class of rotating black rings on Taub-NUT space via inverse-scattering, generalizing previous solutions to more complex backgrounds.
Findings
New solutions describing rotating black rings on Taub-NUT
Analysis of properties in five- and four-dimensional perspectives
Connections to charged black holes and magnetic monopoles
Abstract
In this paper, we construct new solutions describing rotating black rings on Taub-NUT using the inverse-scattering method. These are five-dimensional vacuum space-times, generalising the Emparan-Reall and extremal Pomeransky-Sen'kov black rings to a Taub-NUT background space. When reduced to four dimensions in Kaluza-Klein theory, these solutions describe (possibly rotating) electrically charged black holes in superposition with a finitely separated magnetic monopole. Various properties of these solutions are studied, from both a five- and four-dimensional perspective.
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