This article may be too technical for most readers to understand.(December 2012) |
In mathematical physics, a GibbonsâHawking space, named after Gary Gibbons and Stephen Hawking, is essentially a hyperkähler manifold with an extra U(1) symmetry. [1] (In general, GibbonsâHawking metrics are a subclass of hyperkähler metrics. [2]) GibbonsâHawking spaces, especially ambipolar ones, [3] find an application in the study of black hole microstate geometries. [1] [4]
This article may be too technical for most readers to understand.(December 2012) |
In mathematical physics, a GibbonsâHawking space, named after Gary Gibbons and Stephen Hawking, is essentially a hyperkähler manifold with an extra U(1) symmetry. [1] (In general, GibbonsâHawking metrics are a subclass of hyperkähler metrics. [2]) GibbonsâHawking spaces, especially ambipolar ones, [3] find an application in the study of black hole microstate geometries. [1] [4]