Radial fractional Laplace operators and Hessian inequalities

Abstract

In this paper we deduce a formula for the fractional Laplace operator (-)s on radially symmetric functions useful for some applications. We give a criterion of subharmonicity associated with (-)s, and apply it to a problem related to the Hessian inequality of Sobolev type: ∫Rn|(-)kk+1 u|k+1 dx C ∫Rn - u \, Fk[u] \, dx, where Fk is the k-Hessian operator on Rn, 1 k < n2, under some restrictions on a k-convex function u. In particular, we show that the class of u for which the above inequality was established in FFV contains the extremal functions for the Hessian Sobolev inequality of X.-J. Wang W1. This is proved using logarithmic convexity of the Gaussian ratio of hypergeometric functions which might be of independent interest.