Multiplicities, invariant subspaces and an additive formula

Abstract

Let T = (T1, …, Tn) be a commuting tuple of bounded linear operators on a Hilbert space H. The multiplicity of T is the cardinality of a minimal generating set with respect to T. In this paper, we establish an additive formula for multiplicities of a class of commuting tuples of operators. A special case of the main result states the following: Let n ≥ 2, and let Qi, i = 1, …, n, be a proper closed shift co-invariant subspaces of the Dirichlet space or the Hardy space over the unit disc in C. If Qi, i = 1, …, n, is a zero-based shift invariant subspace, then the multiplicity of the joint Mz = (Mz1, …, Mzn)-invariant subspace (Q1 ·s Qn) of the Dirichlet space or the Hardy space over the unit polydisc in Cn is given by \[ multM z| (Q1 ·s Qn) (Q1 ·s Qn) = Σi=1n (multMz|Qi (Qi)) = n. \] A similar result holds for the Bergman space over the unit polydisc.