A Jordan-like decomposition theorem for valuations on star bodies

Abstract

We show that every radial continuous valuation V: S0n→ R defined on the n-dimensional star bodies S0n, and verifying V(\0\)=0, can be decomposed as a sum V=V+-V-, where both V+ and V- are positive radial continuous valuations on S0n with V+(\0\)=V-(\0\)=0. As an application, we show that radial continuous rotationally invariant valuations V on S0n can be characterized as the applications on star bodies which can be written as V(K)=∫Sn-1θ(K)dm, where θ:[0,∞)→ R is a continuous function, K is the radial function associated to K and m is the Lebesgue measure on Sn-1. This completes recent work of the second named author, where an analogous result is proved for the case of positive radial continuous rotationally invariant valuations.