An Invariant Subspace Theorem and Invariant Subspaces of Analytic Reproducing Kernel Hilbert Spaces - II

This paper is a follow-up contribution to our work (Sarkar in J Oper Theory, 73:433–441, 2015) where we discussed some invariant subspace results for contractions on Hilbert spaces. Here we extend the results of (Sarkar in J Oper Theory, 73:433–441, 2015) to the context of n-tuples of bounded linear operators on Hilbert spaces. Let \(T = (T_1, \ldots , T_n)\) be a pure commuting co-spherically contractive n-tuple of operators on a Hilbert space \({\mathcal {H}}\) and \({\mathcal {S}}\) be a non-trivial closed subspace of \({\mathcal {H}}\). One of our main results states that: \({\mathcal {S}}\) is a joint T-invariant subspace if and only if there exists a partially isometric operator \(\Pi \in {\mathcal {B}}(H^2_n({\mathcal {E}}), {\mathcal {H}})\) such that \({\mathcal {S}}= \Pi H^2_n({\mathcal {E}})\), where \(H^2_n\) is the Drury–Arveson space and \({\mathcal {E}}\) is a coefficient Hilbert space and \(T_i \Pi = \Pi M_{z_i}\), \(i = 1, \ldots , n\). In particular, it follows that a shift invariant subspace of a “nice” reproducing kernel Hilbert space over the unit ball in \({{\mathbb {C}}}^n\) is the range of a “multiplier” with closed range. Our work addresses the case of joint shift invariant subspaces of the Hardy space and the weighted Bergman spaces over the unit ball in \({{\mathbb {C}}}^n\).