Indefinite determinantal representations versus nonsingularities on the noncommutative d-torus
Abstract
We show that for a multivariable polynomial p(z)=p(z1, … , zd) with a determinantal representation p(z) = p(0) (In- K (j=1d zj Inj)) the matrix K is structurally similar to a strictly J-contractive matrix for some diagonal signature matrix J if and only if the extension of p(z) to a polynomial in d-tuples of matrices of arbitrary size given by \[ p(U1, … , Ud) = p(0,…,0) (In Im- (K Im) (j=1d Inj Uj)), \] where U1,… , Ud ∈ Cm × m, m∈ N, does not have roots on the noncommutative d-torus consisting of d-tuples (U1, … , Ud) of unitary matrices of arbitrary size.
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