Mass transportation functionals on the sphere with applications to the logarithmic Minkowski problem

Abstract

We study the transportation problem on the unit sphere Sn-1 for symmetric probability measures and the cost function c(x,y) = 1 x, y . We calculate the variation of the corresponding Kantorovich functional K and study a naturally associated metric-measure space on Sn-1 endowed with a Riemannian metric generated by the corresponding transportational potential. We introduce a new transportational functional which minimizers are solutions to the symmetric log-Minkowski problem and prove that K satisfies the following analog of the Gaussian transportation inequality for the uniform probability measure σ on Sn-1: 1n Ent() K(σ, ). It is shown that there exists a remarkable similarity between our results and the theory of the K\"ahler-Einstein equation on Euclidean space. As a by-product we obtain a new proof of uniqueness of solution to the log-Minkowski problem for the uniform measure.