Inner multipliers and Rudin type invariant subspaces
Abstract
Let E be a Hilbert space and H2E(D) be the E-valued Hardy space over the unit disc D in C. The well known Beurling-Lax-Halmos theorem states that every shift invariant subspace of H2E(D) other than \0\ has the form H2E*(D), where is an operator-valued inner multiplier in H∞B(E*, E)(D) for some Hilbert space E*. In this paper we identify H2(Dn) with H2(Dn-1)-valued Hardy space H2H2(Dn-1)(D) and classify all such inner multiplier ∈ H∞B(H2(Dn-1))(D) for which H2H2(Dn-1)(D) is a Rudin type invariant subspace of H2(Dn).
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