Uniqueness theorem for charged dipole rings in five-dimensional minimal supergravity

TL;DR

This paper proves a uniqueness theorem for charged dipole rotating black rings in five-dimensional minimal supergravity, showing they are characterized by specific parameters including dipole charge and rod structure.

Contribution

It extends previous uniqueness results to include black rings with dipole charge, highlighting the importance of dipole charge as a non-conserved parameter.

Findings

Uniqueness of charged dipole black rings under specified conditions.

Dipole charge is a key distinguishing parameter for these black rings.

Theorem does not straightforwardly extend to black lenses within the same theory.

Abstract

We show a uniqueness theorem for charged dipole rotating black rings in the bosonic sector of five-dimensional minimal supergravity, generalizing our previous work [arXiv:0901.4724] on the uniqueness of charged rotating black holes with topologically spherical horizon in the same theory. More precisely, assuming the existence of two commuting axial Killing vector fields, we prove that an asymptotically flat, stationary charged rotating black hole with non-degenerate connected event horizon of cross-section topology S^1XS^2 in the five-dimensional Einstein-Maxwell-Chern-Simons theory-if exists-is characterized by the mass, charge, two independent angular momenta, dipole charge, and the rod structure. As anticipated, the necessity of specifying dipole charge-which is not a conserved charge-is the new, distinguished ingredient that highlights difference between the present theorem and the corresponding theorem for vacuum case, as well as difference from the case of topologically spherical horizon within the same minimal supergravity. We also consider a similar boundary value problem for other topologically non-trivial black holes within the same theory, and find that generalizing the present uniqueness results to include black lenses-provided there exists such a solution in the theory-would not appear to be straightforward.