An invariant subspace theorem

We establish new invariant subspace theorems for positive operators on Banach lattices. Here are three sample results. - If a quasinilpotent positive operator \(S\) dominates a non-zero compact operator \(K\) (i.e., \(|K x| \leqslant S|x|\) for each \(x\) ), then every positive operator that commute

In this paper, using the theory of Hilbert modules we study invariant subspaces of the Bergman spaces on bounded symmetric domains and quasi-invariant subspaces of the Segal-Bargmann spaces. We completely characterize small Hankel operators with finite rank on these spaces.

Given an inner function % on the unit disk D, let K p % :=H p & %zÄ H p be the corresponding star-invariant subspace of the Hardy space H p . We are concerned with embedding theorems of the form K p % /L q (+), where + is a measure on D, and some related norm inequalities. In particular, assuming th