Power bounded m-left invertible operators

Abstract

A Hilbert space operator S∈ is left m-invertible by T∈ if Σj=0m(-1)m-j(arrayclcrm\array)TjSj=0, S is m-isometric if Σj=0m(-1)m-j(arrayclcrm\array)S*jSj=0 and S is (m,C)-isometric for some conjugation C of if Σj=0m(-1)m-j(arrayclcrm\array)S*jCSjC=0. If a power bounded operator S is left invertible by a power bounded operator T, then S (also, T*) is similar to an isometry. Translated to m-isometric and (m,C)-isometric operators S this implies that S is 1-isometric, equivalently isometric, and (respectively) (1,C)-isometric.