Power-bounded operators and related norm estimates

Abstract

We consider whether L = limsupn to infty n ||Tn+1-Tn|| < infty implies that the operator T is power bounded. We show that this is so if L<1/e, but it does not necessarily hold if L=1/e. As part of our methods, we improve a result of Esterle, showing that if sigma(T) = 1 and T != I, then liminfn to infty n ||Tn+1-Tn|| >= 1/e. The constant 1/e is sharp. Finally we describe a way to create many generalizations of Esterle's result, and also give many conditions on an operator which imply that its norm is equal to its spectral radius.

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