New Estimates on the bounds of Brunel's operator

Abstract

We study the coefficients of the Taylor series expansion of powers of the function (x)=1-1-xx, where the Brunel operator A A(T) is defined as (T) for any mean-bounded T. We prove several new precise estimates regarding the Taylor coefficients of n for n∈N. We apply these estimates to give an elementary proof that for any mean-bounded, not necessarily positive operator T on a Banach space X, the Brunel operator A(T):X X is power-bounded and satisfies n∈N \|n(An-An+1)\| < ∞ (equivalently, A(T) is a Ritt operator). Along the way we provide specific details of results announced by A. Brunel and R. Emilion in Brunel.