Representations of non-negative polynomials via critical ideals
Abstract
This paper studies the representations of a non-negative polynomial f on a non-compact semi-algebraic set K modulo its critical ideal. Under the assumptions that the semi-algebraic set K is regular and f satisfies the boundary Hessian conditions (BHC) at each zero of f in K, we show that f can be represented as a sum of squares (SOS) of real polynomials modulo its critical ideal if f 0 on K. In particular, we focus on the polynomial ring R[x].
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