Pure contractive multipliers of some reproducing kernel Hilbert spaces and applications
Abstract
A contraction T on a Hilbert space H is said to be pure if the sequence T*n n converges to 0 in the strong operator topology. In this article, we prove that for contractions T, which commute with certain tractable tuples of commuting operators X = (X1,…,Xn) on H, the following statements are equivalent: (i) T is a pure contraction on H, (ii) the compression PW(X)T|W(X) is a pure contraction, where W(X) is the wandering subspace corresponding to the tuple X. An operator-valued multiplier of a vector-valued reproducing kernel Hilbert space (rkHs) is said to be pure contractive if the associated multiplication operator M is a pure contraction. Using the above result, we find that operator-valued mulitpliers (z) of several vector-valued rkHs's on the polydisc Dn as well as the unit ball Bn in Cn are pure contractive if and only if (0) is a pure contraction on the underlying Hilbert space. The list includes Hardy, Bergman and Drury-Arveson spaces. Finally, we present some applications of our characterization of pure contractive multipliers associated with the polydisc.
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