Instability results for the wave equation in the interior of Kerr black holes

Jonathan Luk, Jan Sbierski

Research output: Contribution to journalArticlepeer-review

Abstract / Description of output

We prove that a large class of smooth solutions ψ to the linear wave equation □gψ=0 on subextremal rotating Kerr spacetimes which are regular and decaying along the event horizon become singular at the Cauchy horizon. More precisely, we show that assuming appropriate upper and lower bounds on the energy along the event horizon, the solution has infinite (non-degenerate) energy on any spacelike hypersurfaces intersecting the Cauchy horizon transversally. Extrapolating from known results in the Reissner--Nordström case, the assumed upper and lower bounds required for our theorem are conjectured to hold for solutions arising from generic smooth and compactly supported initial data on a Cauchy hypersurface. This result is motivated by the strong cosmic censorship conjecture in general relativity.
Original languageEnglish
Pages (from-to)1948-1995
Number of pages38
JournalJournal of functional analysis
Volume271
Issue number7
Early online date23 Jun 2016
DOIs
Publication statusPublished - 1 Oct 2016

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