On the Lp Brunn-Minkowski theory and the Lp Minkowski problem for C-coconvex sets

Abstract

Let C be a pointed closed convex cone in Rn with vertex at the origin o and having nonempty interior. The set A⊂ C is C-coconvex if the volume of A is finite and A=C A is a closed convex set. For 0<p<1, the p-co-sum of C-coconvex sets is introduced, and the corresponding Lp Brunn-Minkowski inequality for C-coconvex sets is established. We also define the Lp surface area measures, for 0≠ p∈ R, of certain C-coconvex sets, which are critical in deriving a variational formula of the volume of the Wulff shape associated with a family of functions obtained from the p-co-sum. This motivates the Lp Minkowski problem aiming to characterize the Lp surface area measures of C-coconvex sets. The existence of solutions to the Lp Minkowski problem for all 0≠ p∈ R is established. The Lp Minkowski inequality for 0<p<1 is proved and is used to obtain the uniqueness of the solutions to the Lp Minkowski problem for 0<p<1. For p=0, we introduce (1-τ) A10τ A2, the log-co-sum of two C-coconvex sets A1 and A2 with respect to τ ∈(0, 1), and prove the log-Brunn-Minkowski inequality of C-coconvex sets. The log-Minkowski inequality is also obtained and is applied to prove the uniqueness of the solutions to the log-Minkowski problem that characterizes the cone-volume measures of C-coconvex sets. Our result solves an open problem raised by Schneider in [Schneider, Adv. Math., 332 (2018), pp. 199-219].