Morita Equivalence of W*-Correspondences and their Hardy Algebras

Abstract

Muhly and Solel developed a notion of Morita equivalence for C*- correspondences, which they used to show that if two C*-correspondences E and F are Morita equivalent then their tensor algebras T+(E) and T+(F) are (strongly) Morita equivalent operator algebras. We give the weak* version of this result by considering (weak) Morita equivalence of W*-correspondences and employing Blecher and Kashyap's notion of Morita equivalence for dual operator algebras. More precisely, we show that weak Morita equivalence of W*-correspondences E and F implies weak Morita equivalence of their Hardy algebras H∞(E) and H∞(F). We give special attention to W*-graph correspondences and show a number of results related to their Morita equivalence.