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Igor Klep, Jacob Levenson, Scott McCullough, Fejér--Riesz factorization for positive noncommutative trigonometric polynomials, preprint https://arxiv · arXiv 2511.09267

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Operator-Valued Positivstellens\"atze on Matrix Convex Sets and Free Products of Finite Abelian Groups

math.FA · 2026-04-29 · unverdicted · novelty 8.0

An operator-valued Positivstellensatz equates positivity on matrix convex sets to a weighted sum-of-squares form, enabling an explicit sum-of-squares factorization for positive trigonometric polynomials on free products of finite abelian groups.

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Operator-Valued Positivstellens\"atze on Matrix Convex Sets and Free Products of Finite Abelian Groups math.FA · 2026-04-29 · unverdicted · none · ref 30
An operator-valued Positivstellensatz equates positivity on matrix convex sets to a weighted sum-of-squares form, enabling an explicit sum-of-squares factorization for positive trigonometric polynomials on free products of finite abelian groups.

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