dc.contributor.author Dold, Dominic Nicolas dc.date.accessioned 2018-03-12T16:05:39Z dc.date.available 2018-03-12T16:05:39Z dc.date.issued 2018-04-28 dc.date.submitted 2017-08-16 dc.identifier.uri https://www.repository.cam.ac.uk/handle/1810/273930 dc.description.abstract In recent years, more and more efforts have been expended on the study of $n$-dimensional asymptotically anti-de Sitter spacetimes $(\mathcal{M},g)$ as solutions to the Einstein vacuum equations \begin{align*} \mathrm{Ric}(g)=\frac{2}{n-2}\Lambda\, g \end{align*} with negative cosmological constant $\Lambda$. This has been motivated mainly by the conjectured instability of these solutions. The author of this thesis joins these efforts with two contributions, which are themselves independent of each other. In the first part, we are concerned with a superradiant instability for $n=4$. For any cosmological constant $\Lambda=-3/\ell^2$ and any $\alpha<9/4$, we find a Kerr-AdS spacetime $(\mathcal{M},g_{\mathrm{KAdS}})$, in which the Klein-Gordon equation \begin{align*} \Box_g\psi+\frac{\alpha}{\ell^2}\psi=0 \end{align*} has an exponentially growing mode solution satisfying a Dirichlet boundary condition at infinity. The spacetime violates the Hawking-Reall bound $r_+^2>|a|\ell$. We obtain an analogous result for Neumann boundary conditions if $5/4<\alpha<9/4$. Moreover, in the Dirichlet case, one can prove that, for any Kerr-AdS spacetime violating the Hawking-Reall bound, there exists an open family of masses $\alpha$ such that the corresponding Klein-Gordon equation permits exponentially growing mode solutions. Our result provides the first rigorous construction of a superradiant instability for a negative cosmological constant. In the second part, we study perturbations of five-dimensional Eguchi-Hanson-AdS spacetimes exhibiting biaxial Bianchi IX symmetry. Within this symmetry class, the Einstein vacuum equations are equivalent to a system of non-linear partial differential equations for the radius $r$ of the spheres, the Hawking mass $m$ and $B$, a quantity measuring the squashing of the spheres, which satisfies a non-linear wave equation. First we prove that the system is well-posed as an initial-boundary value problem around infinity $\mathcal{I}$ with $B$ satisfying a Dirichlet boundary condition. Second, we show that initial data in the biaxial Bianchi IX symmetry class around Eguchi-Hanson-AdS spacetimes cannot form horizons in the dynamical evolution. dc.language.iso en dc.rights All rights reserved dc.subject mathematical general relativity dc.subject asymptotically locally AdS dc.subject Klein-Gordon equation dc.subject Einstein vacuum equations dc.title Instabilities in asymptotically AdS spacetimes dc.type Thesis dc.type.qualificationlevel Doctoral dc.type.qualificationname Doctor of Philosophy (PhD) dc.publisher.institution University of Cambridge dc.publisher.department Departement of Pure Mathematics and Mathematical Statistics dc.date.updated 2018-03-12T15:24:47Z dc.identifier.doi 10.17863/CAM.21005 dc.contributor.orcid Dold, Dominic Nicolas [0000-0002-1084-7358] dc.publisher.college Magdalene College dc.type.qualificationtitle PhD cam.supervisor Dafermos, Mihalis cam.thesis.funding true rioxxterms.freetoread.startdate 2018-03-12
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