Nichtnegativstellens\"atze for definable functions in o-minimal structures

Abstract

This paper addresses to Nichtnegativstellens\"atze for definable functions in o-minimal structures on (R, +, ·). Namely, let f, g1, …, gl Rn R be definable Cp-functions (p 2) and assume that f is non-negative on S := \x ∈ Rn \ | \ g1(x) 0, …, gl(x) 0 \. Under some natural hypotheses on zeros of f in S, we show that f is expressible in the form f = φ0 + Σi = 1l φi gi, where each φi is a sum of squares of definable Cp - 2-functions. As a consequence, we derive global optimality conditions which generalize the Karush--Kuhn--Tucker optimality conditions for nonlinear optimization.