Curvature bound for Lp Minkowski problem
Abstract
We establish curvature estimates for anisotropic Gauss curvature flows. By using this, we show that given a measure μ with a positive smooth density f, any solution to the Lp Minkowski problem in Rn+1 with p -n+2 is a hypersurface of class C1,1. This is a sharp result because for each p∈ [-n+2,1) there exists a convex hypersurface of class C1,1n+p-1 which is a solution to the Lp Minkowski problem for a positive smooth density f. In particular, the C1,1 regularity is optimal in the case p=-n+2 which includes the logarithmic Minkowski problem in R3.
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