On odd powers of nonnegative polynomials that are not sums of squares

Abstract

We initiate a systematic study of nonnegative polynomials P such that Pk is not a sum of squares for any odd k≥ 1, calling such P stubborn. We develop a new invariant of a real isolated zero of a nonnegative polynomial in the plane, that we call the SOS-invariant, and relate it to the well-known delta invariant of a plane curve singularity. Using the SOS-invariant we show that any polynomial that spans an extreme ray of the convex cone of nonnegative ternary forms of degree 6 is stubborn. We also show how to use the SOS-invariant to prove stubbornness of ternary forms in higher degree. Furthermore, we prove that in a given degree and number of variables, nonnegative polynomials that are not stubborn form a convex cone, whose interior consists of all strictly positive polynomials.

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