The Minkowski problem of p-affine dual curvature measures
Abstract
For p∈ (-∞,0)(0,1) and a convex body K⊂Rn with the origin in its interior, we construct the family of p-affine dual curvature measures Ip(K,·) with respect to K. The affine-invariant measure Cn-1a(K, ·) given in the paper [9] is the limit case of Ip(K,·) as p→ 1-. The classical cone-volume measure is the limit case of the affine measures 2|p|Ip(K,·)/(n2V(IpK)) when p→ 0 and V(K)=2, where IpK denotes the Lp intersection body of K. The Minkowski problems for the p-affine dual curvature measures are proposed and studied. Specifically, we give a sufficient condition for the existence of a solution to the even Minkowski problem for p-affine dual curvature measure. Moreover, a necessary condition is given when p∈ (0,1). The smooth case of this Minkowski problem is equivalent to solving a new type of partial differential equations with respect to p-cosine transforms.
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