Alpha-admissibility for Ritt operators

Christian Le Merdy

arXiv:1301.4900·math.FA·January 22, 2013

Alpha-admissibility for Ritt operators

Christian Le Merdy

PDF

Open Access

TL;DR

This paper characterizes alpha-admissibility for Ritt operators on Banach spaces, extending Weiss conjecture results and exploring R-boundedness variants with practical examples.

Contribution

It establishes a characterization of alpha-admissibility for Ritt operators under square function estimates and extends the theory to R-boundedness variants.

Findings

01

Admissibility characterized by uniform resolvent estimates.

02

Extension of Weiss conjecture to alpha-admissibility.

03

Examples demonstrating applicability of the theoretical results.

Abstract

Let T : X --> X $b e a p o w er b o u n d e d o p er a t or o n B ana c h s p a ce . A n o p er a t or C : X - - > Y$ is called admissible for T if it satisfies an estimate $\sum_{k} \norm C T^{k} (x)^{2} \leq M^{2} \norm x^{2}$ . Following Harper and Wynn, we study the validity of a certain Weiss conjecture in this discrete setting. We show that when X is reflexive and T is a Ritt operator satisfying a appropriate square function estimate, C is admissible for T if and only if it satisfies a uniform estimate $(1 - ∣ ω ∣^{2})^{1/2} \norm C (I - ω T)^{- 1} \leq K$ for $ω \in \Cdb$ , $∣ ω ∣ < 1$ . We extend this result to the more general setting of alpha-admissibility. Then we investigate a natural variant of admissibility involving R-boundedness and provide examples to which our general results apply.

Peer Reviews

No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.

Videos

No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.

Taxonomy

TopicsAdvanced Harmonic Analysis Research · Advanced Banach Space Theory · Holomorphic and Operator Theory