Polynomials in ℝ[𝕩,𝕪] that are sums of squares in ℝ(𝕩,𝕪)

Leep, David; Starr, Colin

doi:10.1090/S0002-9939-01-05927-5

Polynomials in $\mathbb {R}[x,y]$ that are sums of squares in $\mathbb {R}(x,y)$
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by David B. Leep and Colin L. Starr PDF

Proc. Amer. Math. Soc. 129 (2001), 3133-3141 Request permission

Abstract:

A positive semidefinite polynomial $f \in \mathbb {R}[x,y]$ is said to be $\Sigma (m,n)$ if $f$ is a sum of $m$ squares in $\mathbb {R}(x,y)$, but no fewer, and $f$ is a sum of $n$ squares in $\mathbb {R}[x,y]$, but no fewer. If $f$ is not a sum of polynomial squares, then we set $n=\infty$. It is known that if $m \leq 2$, then $m=n$. The Motzkin polynomial is known to be $\Sigma (4,\infty )$. We present a family of $\Sigma (3,4)$ polynomials and a family of $\Sigma (3, \infty )$ polynomials. Thus, a positive semidefinite polynomial in $\mathbb {R}[x,y]$ may be a sum of three rational squares, but not a sum of polynomial squares. This resolves a problem posed by Choi, Lam, Reznick, and Rosenberg.

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