Volume preserving Gauss curvature flow of convex hypersurfaces in the hyperbolic space

Wei, Yong; Yang, Bo; Zhou, Tailong

doi:10.1090/tran/9095

Volume preserving Gauss curvature flow of convex hypersurfaces in the hyperbolic space
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by Yong Wei, Bo Yang and Tailong Zhou;

Trans. Amer. Math. Soc. 377 (2024), 2821-2854

DOI: https://doi.org/10.1090/tran/9095

Published electronically: February 14, 2024

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Abstract:

We consider the volume preserving flow of smooth, closed and convex hypersurfaces in the hyperbolic space $\mathbb {H}^{n+1} (n\geq 2)$ with the speed given by arbitrary positive power $\alpha$ of the Gauss curvature. We prove that if the initial hypersurface is convex, then the smooth solution of the flow remains convex and exists for all positive time $t\in [0,\infty )$. Moreover, we apply a result of Kohlmann which characterises the geodesic ball using the hyperbolic curvature measures and an argument of Alexandrov reflection to prove that the flow converges to a geodesic sphere exponentially in the smooth topology. This can be viewed as the first result for non-local type volume preserving curvature flows for hypersurfaces in the hyperbolic space with only convexity required on the initial data.

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Volume preserving Gauss curvature flow of convex hypersurfaces in the hyperbolic space
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Abstract: