Growth orders and ergodicity for absolutely Ces\`aro bounded operators

Luciano Abadias; Antonio Bonilla

arXiv:1710.02981·math.FA·October 10, 2017

Growth orders and ergodicity for absolutely Ces\`aro bounded operators

Luciano Abadias, Antonio Bonilla

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Abstract

In this paper, we extend the concept of absolutely Ces\`aro boundedness to the fractional case. We construct a weighted shift operator belonging to this class of operators, and we prove that if $T$ is an absolutely Ces\`{a}ro bounded operator of order $α$ with $0 < α \leq 1,$ then $∥ T^{n} ∥ = o (n^{α})$ , generalizing the result obtained for $α = 1$ . Moreover, if $α > 1$ , then $∥ T^{n} ∥ = O (n)$ . We apply such results to get stability properties for the Ces\`aro means of bounded operators.

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