Two problems on submodules of H2(Dn)

Abstract

Given any shift-invariant closed subspace S (aka submodule) of the Hardy space over the unit polydisc H2(Dn) (where n ≥ 2), let Rzj:=Mzj|S, and Ezj:=PS evzj, for each j ∈ \1,…,n\. Here, evzj is the operator evaluating at 0 in the zj-th variable. In this article, we prove that given any subset ⊂eq \1,…,n\, there exists a collection of one-variable inner functions \φλ (zλ)\λ ∈ on Dn, such that \[ S = Σλ ∈ φλ (zλ)H2(Dn), \] if and only if the conditions (IS-EzkEzk*)(IS-RzkRzk*)=0 for all k ∈ \1,…,n\ , and (IS-EziEzi*)(IS-RziRzi*)(IS-EzjEzj*)(IS-RzjRzj*)=0 for all distinct i,j ∈ are satisfied. Following this, we study R.G. Douglas's question on the commutativity of orthogonal projections onto the corresponding quotient modules.