Ces\`aro Operators on Rooted Directed Trees

Abstract

In this paper, we introduce and investigate the notion of the Ces\'aro operator C T on a rooted directed tree T. When T is the rooted tree with no branching vertex, then C T is unitarily equivalent to the classical Ces\'aro operator C0 on the sequence space 2( N). We prove that for every narrow rooted directed tree T, C T is bounded, with norm bounded above by twice the width of T. When the tree is not narrow, this boundedness result no longer holds. Beyond several spectral properties, assuming T is leafless and narrow, we show that C T is subnormal if and only if T is isomorphic to the rooted directed tree without any branching vertex. In particular, this demonstrates that the verbatim analogue of Kriete-Trutt theorem fails in the context of Ces\'aro operators on rooted directed trees. Nonetheless, under the same hypotheses, C T is always a compact perturbation of a subnormal operator.

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