Expansive operators which are power bounded or algebraic

Abstract

Given Hilbert space operators P,T∈ B(), P≥ 0 invertible, T is (m,P)- expansive (resp., (m,P)- isometric) for some positive integer m if T*,Tm(P)=Σj=0m(-1)j(arrayclcrm\array)T*jPTj≤ 0 (resp., T*,Tm(P)=0). An (m,P)- expansive operator T is power bounded if and only if it is a C1·- operator which is similar to an isometry and satisfies T*,Tn(Q)=0 for some positive invertible operator Q∈ B() and all integers n≥ 1. If, instead, T is an algebraic (m,I)- expansive operator, then either the spectral radius r(T) of T is greater than one or T is the perturbation of a unitary by a nilpotent such that T is (2n-1, I)- isometric for some positive integers m0 ≤ m, m0 odd, and n ≥ m0 +12.