Automorphisms of P(λ)/I_

Abstract

We study conditions on automorphisms of Boolean algebras of the form P(λ)/I (where λ is an uncountable cardinal and I is the ideal of sets of cardinality less than ) which allow one to conclude that a given automorphism is trivial. We show (among other things) that every cardinality-preserving automorphism of P(2)/I+ which is trivial on all sets of cardinality + is trivial, and that MA_1 implies that every automorphism of P(R)/Fin is trivial on a cocountable set.