A short proof of the Y. Katznelson’s and L. Tzafriri’s theorem

Abstract:

A short proof is given to the following theorem of Y. Katznelson and L. Tzafriri: Let $T$ be a power-bounded operator in a Banach space $E$. Then ${\lim _{n \to \infty }}||{T^{n + 1}} - {T^n}|| = 0$ if and only if $\sigma (T) \cap \{ z \in \mathbb {C}:|z| = 1\} \subset \{ 1\}$.