Synthetic timelike Ricci bounds TCD^e_p(K,N) are stable under C^0-limits of Lorentzian metrics, with applications to impulsive gravitational waves and counterexamples to Lorentzian splitting theorems.
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A Hausdorff-type metric is placed on the space of Cauchy hypersurfaces in globally hyperbolic spacetimes, yielding completeness and local compactness results that generalize earlier work by Beem and Takahashi.
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Stability of Synthetic Timelike Ricci Bounds under $C^0$-Limits and Applications to Impulsive Gravitational Waves
Synthetic timelike Ricci bounds TCD^e_p(K,N) are stable under C^0-limits of Lorentzian metrics, with applications to impulsive gravitational waves and counterexamples to Lorentzian splitting theorems.
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Hausdorff-type metric geometry of the space of Cauchy hypersurfaces
A Hausdorff-type metric is placed on the space of Cauchy hypersurfaces in globally hyperbolic spacetimes, yielding completeness and local compactness results that generalize earlier work by Beem and Takahashi.