Hessian valuations

Abstract

A new class of continuous valuations on the space of convex functions on Rn is introduced. On smooth convex functions, they are defined for i=0,…,n by equation* u ∫Rn ζ(u(x),x,∇ u(x))\,[D2 u(x)]i\, d x equation* where ζ∈ C(R×Rn×Rn) and [D2 u]i is the ith elementary symmetric function of the eigenvalues of the Hessian matrix, D2 u, of u. Under suitable assumptions on ζ, these valuations are shown to be invariant under translations and rotations on convex and coercive functions.