Schur-class multipliers on the Arveson space: de Branges-Rovnyak reproducing kernel spaces and commutative transfer-function realizations
Abstract
An interesting and recently much studied generalization of the classical Schur class is the class of contractive operator-valued multipliers S for the reproducing kernel Hilbert space H(kd) on the unit ball Bd ⊂ Cd, where kd is the positive kernel kd(λ, ζ) = 1/(1 - < λ, ζ >) on Bd. The reproducing kernel space H(KS) associated with the positive kernel KS(λ, ζ) = (I - S(λ) S(ζ)*) · kd(λ, ζ) is a natural multivariable generalization of the classical de Branges-Rovnyak canonical model space. A special feature appearing in the multivariable case is that the space H(KS) in general may not be invariant under the adjoints Mλj* of the multiplication operators Mλj f(λ) λj f(λ) on H(kd). We show that invariance of H(KS) under Mλj* for each j = 1, ..., d is equivalent to the existence of a weakly coisometric realization for S of the form S(λ) = D + C (I - λ1A1 ... - λd Ad)-1(λ1B1 + ... + λd Bd) such that the state operators A1, ..., Ad pairwise commute. We show that this special situation always occurs for the case of inner functions S (where the associated multiplication operator MS is a partial isometry), and that inner multipliers are characterized by the existence of such a realization such that the state operators A1, >..., Ad satisfy an additional stability property.
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