Lp-Brunn-Minkowski inequality for p∈ (1-cn32, 1)
Abstract
Kolesnikov-Milman [9] established a local Lp-Brunn-Minkowski inequality for p∈(1-c/n32,1). Based on their local uniqueness results for the Lp-Minkowski problem, we prove in this paper the (global) Lp-Brunn-Minkowski inequality. Two uniqueness results are also obtained: the first one is for the Lp-Minkowski problem when p∈ (1-c/n32, 1) for general measure with even positive Cα density, and the second one is for the Logarithmic Minkowski problem when the density of measure is a small Cα even perturbation of the uniform density.
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