Anisotropic flows without global terms and dual Orlicz Christoffel-Minkowski type problem
Abstract
In this paper, we study the long-time existence and asymptotic behavior for a class of anisotropic non-homogeneous curvature flows without global forcing terms. By the stationary solutions of such anisotropic flows, we obtain existence results for a class of dual Orlicz Christoffel-Minkowski type problems, which is equivalent to solve the PDE G(x,uK,DuK)F(D2uK+uKI)=1 on Sn for a convex body K, where D is the covariant derivative with respect to the standard metric on Sn and I is the unit matrix of order n. This result covers many previous known solutions to Lp dual Minkowski problem, Lp dual Christoffel-Minkowski problem, and some dual Orlicz Minkowski problem etc.. Meanwhile, the variational formula of some modified quermassintegrals and the corresponding prescribed area measure problem (Orlicz Christoffel-Minkowski type problem) are considered, and inequalities involving modified quermassintegrals are also derived. As corollary, this gives a partial answer about the general prescribed curvature problem raised in Guan-Ren-Wang (CPAM, 2015).
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