Open AccessInjectivity radius and optimal regularity of Lorentzian manifolds with bounded curvature
Author(s) -
Philippe G. LeFloch
Publication year - 2008
Publication title -
séminaire de théorie spectrale et géométrie
Language(s) - English
Resource type - Journals
eISSN - 2118-9242
pISSN - 1624-5458
DOI - 10.5802/tsg.261
Subject(s) - bounded function , curvature , mathematics , mathematical analysis , mean curvature , norm (philosophy) , radius of curvature , upper and lower bounds , constant (computer programming) , sectional curvature , observer (physics) , radius , pure mathematics , geometry , scalar curvature , physics , computer science , computer security , quantum mechanics , political science , law , programming language
We review recent work on the local geometry and optimal regularity of Lorentzian manifolds with bounded curvature. Our main results provide an estimate of the injectivity radius of an observer, and a local canonical foliations by CMC (Constant Mean Curvature) hypersurfaces, together with spatially harmonic coordinates. In contrast with earlier results based on a global bound for derivatives of the curvature, our method requires only a sup-norm bound on the curvature near the given observer.
Accelerating Research
Robert Robinson Avenue,
Oxford Science Park, Oxford
OX4 4GP, United Kingdom
Address
John Eccles HouseRobert Robinson Avenue,
Oxford Science Park, Oxford
OX4 4GP, United Kingdom