Products of Idempotents in Banach Algebras of Operators
Abstract
Let X be a Banach space and A be the Banach algebra B(X) of bounded (i.e. continuous) linear transformations (to be called operators) on X to itself. Let E be the set of idempotents in A and S be the semigroup generated by E under composition as multiplication. If T∈ S with 0 T IX then T has a local block representation of the form pmatrix T1 & T2 0 & 0 pmatrix on X=Y Z, a topological sum of non-zero closed subspaces Y and Z of X, and any A∈ A has the form pmatrix A1 & A2 A3 & A4 pmatrix with T1,A1 ∈ B(Y), T2,A2∈ B(Z,Y), A3∈ B(Y,Z), and A4 ∈ B(Z). The purpose of this paper is to study conditions for T to be in S.
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