Reducing Subspaces of de Branges-Rovnyak Spaces

Abstract

For b∈ H∞1, the closed unit ball of H∞, the de Branges-Rovnyak spaces H(b) is a Hilbert space contractively contained in the Hardy space H2 that is invariant by the backward shift operator S*. We consider the reducing subspaces of the operator S*2|H(b). When b is an inner function, S*2|H(b) is a truncated Toepltiz operator and its reducibility was characterized by Douglas and Foias using model theory. We use another approach to extend their result to the case where b is extreme. We prove that if b is extreme but not inner, then S*2|H(b) is reducible if and only if b is even or odd, and describe the structure of reducing subspaces.