Characterization of Invariant subspaces in the polydisc
Abstract
We give a complete characterization of invariant subspaces for (Mz1, …, Mzn) on the Hardy space H2(Dn) over the unit polydisc Dn in Cn, n >1. In particular, this yields a complete set of unitary invariants for invariant subspaces for (Mz1, …, Mzn) on H2(Dn), n > 1. As a consequence, we classify a large class of n-tuples, n > 1, of commuting isometries. All of our results hold for vector-valued Hardy spaces over Dn, n > 1. Our invariant subspace theorem solves the well-known open problem on characterizations of invariant subspaces of the Hardy space over the unit polydisc.
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