Algebras of diagonal operators of the form scalar-plus-compact are Calkin algebras

Abstract

For every Banach space X with a Schauder basis consider the Banach algebra R Idiag(X) of all diagonal operators that are of the form λ I + K. We prove that R Idiag(X) is a Calkin algbra i.e., there exists a Banach space YX so that the Calkin algebra of YX is isomorphic as a Banach algebra to R Idiag(X). Among other applications of this theorem we obtain that certain hereditarily indecomposable spaces and the James spaces Jp and their duals endowed with natural multiplications are Calkin algebras, that all non-reflexive Banach spaces with unconditional bases are isomorphic as Banach spaces to Calkin algebras, and that sums of reflexive spaces with unconditional bases with certain James-Tsirelson type spaces are isomorphic as Banach spaces to Calkin algebras.