Superatomic Boolean algebras constructed from strongly unbounded functions

Abstract

Using Koszmider's strongly unbounded functions, we show the following consistency result: Suppose that ,λ are infinite cardinals such that +++ ≤ λ, <= and 2= +, and η is an ordinal with +≤ η <++ and cf(η) = +. Then, in some cardinal-preserving generic extension there is a superatomic Boolean algebra B such that - ht(B) = η + 1, - the cardinality of the αth level of B is for every α <η, - and the cardinality of the ηth level of B is λ Especially, \<ω\>ω1 \<ω3\> and \<ω1\>ω2 \<ω4\> can be cardinal sequences of superatomic Boolean algebras.