New quermassintegral and Poincar\'e type inequalities for non-convex domains

Abstract

In the first part of this paper, we study the following non-homogeneous, locally constrained inverse curvature flow in Euclidean space Rn+1, align* x=(1Ek()Ek-1()-α - x,), k=2,3,…,n-1. align* Assuming that the initial hypersurface M0 ⊂ Rn+1 is star-shaped and its shifted principal curvatures =+α(1,…,1) lie in the convex set align* α,k:=k-1 \λ∈ Rn:\, Ek(λ)-α Ek-1(λ)>0\, align* we show that the flow admits a smooth solution that exists for all positive times, and it converges smoothly to a round sphere. As a corollary, we obtain a new set of Alexandrov-Fenchel-type inequalities for non-convex domains. In the second part, we derive a Poincar\'e type inequality for k-convex hypersurfaces which complements a more general version of the well-known Heintze-Karcher inequality.