A non-existence result for the Lp-Minkowski problem
Abstract
We show that given a real number p<1, a positive integer n and a proper subspace H of Rn, the measure on the Euclidean sphere Sn-1, which is concentrated in H and whose restriction to the class of Borel subsets of Sn-1 H equals the spherical Lebesgue measure on Sn-1 H, is not the Lp-surface area measure of any convex body. This, in particular, disproves a conjecture from [Bianchi, B\"or\"oczky, Colesanti, Yang, The Lp-Minkowski problem for -n<p<1, Adv. Math. (2019)].
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