Interpolation for intersections of Hardy-type spaces

Abstract

Let (X,μ) be a space with a finite measure μ, let A and B be w*-closed subalgebras of L∞(μ), and let C and D be closed subspaces of Lp(μ) (1<p<∞) that are modules over A and B, respectively. Under certain additional assumptions, the couple (C D, C D L∞(μ)) is K-closed in (Lp(μ), L∞(μ)). This statement covers, in particular, two cases analyzed previously: that of Hardy spaces on the two-dimensional torus and that of the coinvariant subspaces of the shift operator on the circle. Next, many situations when A and B are w*-Dirichlet algebras also fit in this pattern.