A hierarchy of Banach spaces with C(K) Calkin Algebras
Abstract
For every well founded tree T having a unique root such that every non-maximal node of it has countable infinitely many immediate successors, we construct a L∞-space XT. We prove that for each such tree T, the Calkin algebra of XT is homomorphic to C(T), the algebra of continuous functions defined on T, equipped with the usual topology. We use this fact to conclude that for every countable compact metric space K there exists a L∞-space whose Calkin algebra is isomorphic, as a Banach algebra, to C(K).
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