Bilattices and Morita equivalence of masa bimodules

Abstract

We define an equivalence relation between bimodules over maximal abelian selfadjoint algebras (masa bimodules) which we call spatial Morita equivalence. We prove that two reflexive masa bimodules are spatially Morita equivalent iff their (essential) bilattices are isomorphic. We also prove that if S1, S2 are bilattices which correspond to reflexive masa bimodules U1, U2 and f: S1→ S2 is an onto bilattice homomorphism, then: (i) If U1 is synthetic, then U2 is synthetic. (ii) If U2 contains a nonzero compact (or a finite or a rank 1) operator, then U1 also contains a nonzero compact (or a finite or a rank 1) operator.