On Differentiability of Volume Time Functions |
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| Authors: | Piotr T. Chruściel James D. E. Grant Ettore Minguzzi |
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| Affiliation: | 1.Fakult?t für Physik and Erwin Schr?dinger Institute,Universit?t Wien,Wien,Austria;2.Department of Mathematics, Faculty of Engineering and Physical Sciences,University of Surrey,Guildford,UK;3.Dipartimento di Matematica e Informatica “U. Dini”,Università degli Studi di Firenze,Florence,Italy |
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| Abstract: | We show differentiability of a class of Geroch’s volume functions on globally hyperbolic manifolds. Furthermore, we prove that every volume function satisfies a local anti-Lipschitz condition over causal curves, and that locally Lipschitz time functions which are locally anti-Lipschitz can be uniformly approximated by smooth time functions with timelike gradient. Finally, we prove that in stably causal space-times Hawking’s time function can be uniformly approximated by smooth time functions with timelike gradient. |
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