Uncountable almost irredundant sets in nonseparable C*-algebras

Abstract

In this article, we consider the notion of almost irredundant sets: A subset X of a C*-algebra A is called almost irredundant if and only if for every a∈ X, the element a does not belong to the norm-closure of \Σi=1n λi Πj=1niai,j: where ai,j ∈ X\a\ and Σ |λi|≤ 1\. Since every almost irrredundant set is in particular a discrete set, it follows that the density of A is an upper bound for the size of almost irredundant sets. We prove that under the Proper Forcing Axiom (PFA), there is an uncountable almost irredundant set in every C*-algebra with an uncountable increasing sequence of ideals. In particular, assuming PFA, every nonseparable scattered C*-algebra admits an uncountable almost irredundant set.