We establish a new uniqueness theorem for the three dimensional Schwarzschild-de Sitter metrics. For this, some new or improved tools are developed. These include a reverse Łojasiewicz inequality, which holds in a neighborhood of the extremal points of any smooth function. We further prove the smoothness of the set of maxima of the lapse, whenever this set contains a topological hypersurface. This leads to a new strategy for the classification of well behaved static solutions of vacuum Einstein equations with a positive cosmological constant, based on the geometry of the maximum-set of the lapse.
On the Uniqueness of Schwarzschild–de Sitter Spacetime / Borghini, Stefano; Chruściel, Piotr T.; Mazzieri, Lorenzo. - In: ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS. - ISSN 0003-9527. - 247:2(2023), pp. 2201-2235. [10.1007/s00205-023-01860-1]
On the Uniqueness of Schwarzschild–de Sitter Spacetime
Borghini, Stefano;Mazzieri, Lorenzo
2023
Abstract
We establish a new uniqueness theorem for the three dimensional Schwarzschild-de Sitter metrics. For this, some new or improved tools are developed. These include a reverse Łojasiewicz inequality, which holds in a neighborhood of the extremal points of any smooth function. We further prove the smoothness of the set of maxima of the lapse, whenever this set contains a topological hypersurface. This leads to a new strategy for the classification of well behaved static solutions of vacuum Einstein equations with a positive cosmological constant, based on the geometry of the maximum-set of the lapse.| File | Dimensione | Formato | |
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