Fej\'er--Riesz factorization for positive noncommutative trigonometric polynomials
Abstract
We prove a Fej\'er-Riesz type factorization for positive matrix-valued noncommutative trigonometric polynomials on W×Y, where W is either the free semigroup x g or the free product group Z2g, and Y is a discrete group. More precisely, using the shortlex order, if A has degree at most w in the W variables and is uniformly strictly positive on all unitary representations of W×Y, then A=B*B with B analytic and of W-degree at most w; this degree bound is optimal, and strict positivity is essential. As an application, we obtain degree-bounded sums-of-squares certificates for Bell-type inequalities in C[Z2*g× Z2*h] from quantum information theory. In the special case W=Zh we recover, in the matrix-valued setting, the classical commutative multivariable Fej\'er-Riesz factorization. For trivial Y we obtain a ``perfect'' group-algebra Positivstellensatz on Z2*g that does not require strict positivity; this result is sharp, as demonstrated by counterexamples in Z2*Z3 and Z3*2. To establish our main results two novel ingredients of independent interest are developed: (a) a positive-semidefinite Parrott theorem with entries given by functions on a group; and (b) solutions to positive semidefinite matrix completion problems for x g or the free product group Z2*g indexed by words in W of length w.
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