Factorizations and minimality of the Calkin Algebra norm for C(K)-spaces

Abstract

For a scattered, locally compact Hausdorff space K, we prove that the essential norm on the Calkin algebra B(C0(K))/K(C0(K)) is a minimal algebra norm. The proof relies on establishing a quantitative factorization for the identity operator on c0 through non-compact operators T: C0(K) X, where X is any Banach space that does not contain a copy of 1 or whose dual unit ball is weak* sequentially compact. It follows that, for every ordinal α, the algebras B(C[0,α])) and B(C[0,α]))/K(C[0,α])) have an unique algebra norm.