Derivations on ideals in commutative AW*-algebras

Abstract

Let A be a commutative AW*-algebra, let S(A) be the *-algebra of all measurable operators affiliated with A, let I be an ideal in A, let s(I) be the support of the ideal I and let Y be a solid subspace in S(A). The necessary and sufficient conditions of existence of non-zero band preserving derivations from I to Y are given. We show that, in case when Y⊂A, or Y is a quasi-normed solid space, any band preserving derivation from I into Y is always trivial. At the same time, there exist non-zero band preserving derivations from I with values in S(A), if and only if the Boolean algebra of all projections from the AW*-algebra s(I)A is not σ-distributive.