Some Extremal Symmetric Inequalities

Abstract

Let Hn,d := R[x1,…, xn]d be the set of all the homogeneous polynomials of degree d, and let Hn,ds := Hn,dSn be the subset of all the symmetric polynomials. For a semialgebraic subset of A ⊂ Rn and a vector subspace H ⊂ Hn,d, we define a PSD cone P(A, H) by P(A, H) := \f ∈ H | f(a) ≥ 0 (∀ a ∈ A)\. In this article, we study a family of extremal symmetric polynomials of P3,6 := P(R3, H3,6) and that of P4,4 := P(R4, H4,4). We also determine all the extremal polynomials of P3,5s+ := P(R+3, H3,5s) where R+ := \ x ∈ R, x ≥ 0 \. Some of them provide extremal polynomials of P3,10.