Representation and Approximation of Positivity Preservers

Abstract

We consider a closed set S in Rn and a linear operator on the polynomial algebra R[X1,...,Xn] that preserves nonnegative polynomials, in the following sense: if f≥ 0 on S, then (f)≥ 0 on S as well. We show that each such operator is given by integration with respect to a measure taking nonnegative functions as its values. This can be seen as a generalization of Haviland's Theorem, which concerns linear functionals on polynomial algebras. For compact sets S we use the result to show that any nonnegativity preserving operator is a pointwise limit of very simple nonnegativity preservers with finite dimensional range.