Resolvent conditions and growth of powers of operators

Abstract

Following Berm\'udez et al. (ArXiv: 1706.03638v1), we study the rate of growth of the norms of the powers of a linear operator, under various resolvent conditions or Ces\`aro boundedness assumptions. We show that T is power-bounded if (and only if) both T and T* are absolutely Ces\`aro bounded. In Hilbert spaces, we prove that if T satisfies the Kreiss condition, \|Tn\|=O(n/ n); if T is absolutely Ces\`aro bounded, \|Tn\|=O(n1/2 -) for some >0 (which depends on T); if T is strongly Kreiss bounded, then \|Tn\|=O(( n)) for some >0. We show that a Kreiss bounded operator on a reflexive space is Abel ergodic, and its Ces\`aro means of order α converge strongly when α >1.