LINEAR STABILITY OF BLACK HOLES [d'apres M. Dafermos et I. Rodnianski]

被引:0
作者
Klainerman, Sergiu [1 ]
机构
[1] Princeton Univ, Dept Math, Princeton, NJ 08544 USA
关键词
WAVE-EQUATION; CAUCHY-PROBLEM; UNIFORM DECAY; SCHWARZSCHILD; PERTURBATIONS; ENERGY;
D O I
暂无
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
Nonlinear stability of black holes is one of the central open problem in General Relativity today. Heuristic, physics type, arguments have been advanced to establish the first necessary step, i.e. linear stability; yet none of them were either convincing or sufficiently robust to apply to the nonlinear setting. This situation has changed dramatically in the last few years through new geometric methods introduced by a number of authors. In my talk I will try to present the main ideas behind these results and focus, in particular, on the remarkable new results of M. Dafermos and I. Rodnianski on the boundedness and decay of solutions to the wave equation in a Kerr background.
引用
收藏
页码:91 / +
页数:46
相关论文
共 45 条
[1]   Uniqueness of Smooth Stationary Black Holes in Vacuum: Small Perturbations of the Kerr Spaces [J].
Alexakis, S. ;
Ionescu, A. D. ;
Klainerman, S. .
COMMUNICATIONS IN MATHEMATICAL PHYSICS, 2010, 299 (01) :89-127
[2]  
Alexakis S., ARXIV09021173
[3]   Energy Multipliers for Perturbations of the Schwarzschild Metric [J].
Alinhac, Serge .
COMMUNICATIONS IN MATHEMATICAL PHYSICS, 2009, 288 (01) :199-224
[4]  
ANDERSSON L, ARXIV09082265
[5]  
[Anonymous], 1973, CAMBRIDGE MONOGRAPHS
[6]  
[Anonymous], 1983, INT SERIES MONOGRAPH
[7]  
Bieri L., 2007, THESIS ETH ZURICH
[8]  
BLUE P., ARXIVGRQC0310091
[9]   Uniform decay of local energy and the semi-linear wave equation on Schwarzschild space [J].
Blue, Pieter ;
Sterbenz, Jacob .
COMMUNICATIONS IN MATHEMATICAL PHYSICS, 2006, 268 (02) :481-504
[10]  
Carter B., 1968, Communications in Mathematical Physics, V10, P280