Michael-Simon type inequalities in hyperbolic space Hn+1 via Brendle-Guan-Li's flows
Abstract
In the present paper, we first establish and verify a new sharp hyperbolic version of the Michael-Simon inequality for mean curvatures in hyperbolic space Hn+1 based on the locally constrained inverse curvature flow introduced by Brendle, Guan and Li, provided that M is h-convex and f is a positive smooth function, where λ'(r)=coshr. In particular, when f is of constant, (0.1) coincides with the Minkowski type inequality stated by Brendle, Hung, and Wang. Further, we also establish and confirm a new sharp Michael-Simon inequality for the k-th mean curvatures in Hn+1 by virtue of the Brendle-Guan-Li's flow, provided that M is h-convex and is the domain enclosed by M. In particular, when f is of constant and k is odd, (0.2) is exactly the weighted Alexandrov-Fenchel inequalities proven by Hu, Li, and Wei.
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