A Smiley-type theorem for spectral operators of finite type

Abstract

In this short article, we mainly prove that, for any spectral operator A of type m on a complex Hilbert space, if a bounded operator B lies in the collection of bounded linear operators that are in the k-centralizer of every bounded linear operator in the l-centralizer of A, where k≤slant l is two arbitrary positive integers satisfying l≥slant k as well as l≥slant 2m+1, then B must belong to the von Neumann algebra generated by A and identity operator. This result generalizes a matrix commutator theorem proved by M.\ F.\ Smiley. For this aim, Smiley-type operators are defined and studied.