Reduced Products of Collapsing Algebras

Abstract

rp ( B) denotes the reduced power Bω / of a Boolean algebra B, where is the Fr\'echet filter on ω. We investigate iterated reduced powers ( rp 0 ( B)= B and rp n+1 ( B )= rp ( rp n ( B))) of collapsing algebras and our main intention is to classify the algebras rp n ( Col (λ ,)), n∈ N, up to isomorphism of their Boolean completions. In particular, assuming that SCH and h =ω 1 hold, we show that for any cardinals λ≥ ω and ≥ 2 such that λ >ω and cf (λ )≤ c we have ro ( rp n( Col (λ ,))) Col (ω 1, ( <λ )ω ), for each n∈ N. If b = d and 0 does not exist, then the same holds whenever cf (λ )= ω.