Ph.D. Oral Defense - Kael Dixon
The Department of Mathematics and Statistics invites you to attend the Ph.D. Oral Defense of Mr. Kael Dixon
THESIS TITLE: Completions of regular ambitoric 4-manifolds: Riemannian Kerr metrics and beyond
COMMITTEE MEMBERS
Chair
David A. Stephens, Professor, Department of Mathematics and Statistics, Â鶹AV
Supervisors
Niky Kamran, Professor, Department of Mathematics and Statistics, Â鶹AV
Vestislav Apostolov, Professor, Département de mathématiques, Université du Québec à MontréalÂ
Internal Examiner
Jaques Hurtubise, Professor, Mathematics and Statistics, Â鶹AV
External Member
Alexander Maloney, Associate Professor of Physics, Department of Physics, Â鶹AV
Pro-Dean
TBA
ABSTRACT
We show that the conformal structure for the Riemannian analogues of Kerr black-hole metrics can be given an ambitoric structure. We then discuss the properties of the moment maps. In particular, we observe that the moment map image is not locally convex near the singularity corresponding to the ring singularity in the interior of the black hole. We also study the Tomimatsu-Sato metrics, whichgeneralize the Kerr metrics. We show that these also admit Riemannian signature analogues, and admit almost-complex analogues of ambitoric structures. We then proceed to classify regular ambitoric 4-orbifolds with some completeness assumptions. The tools developed also allow us to prove a partial classi cation of ompact Riemannian 4-manifolds which admit a Killing 2-form.