On the uniqueness of even Lp Minkowski problem

Abstract

We prove that there is a unique p0∈ [0,1), which can be characterized by the eigenvalue of Hilbert operator related to a convex body, that the even Lp Minkowski problem has a unique solution for p≥ p0, and the uniqueness fails for infinitely many convex bodies if p<p0. The previous results by many experts in the field assert that the uniqueness holds for p>p0.

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