$AC(\sigma)$ operators

TL;DR

This paper extends the theory of well-bounded operators to include operators with complex spectra by introducing $AC(\sigma)$ operators, analyzing their spectral properties and positioning within existing operator classes.

Contribution

It develops the spectral theory of $AC(\sigma)$ operators and clarifies their relation to other classes of operators, expanding the functional calculus framework.

Findings

$AC(\sigma)$ operators include well-bounded and scalar-type spectral operators

$AC(\sigma)$ operators form a class smaller than $AC$ operators of Berkson and Gillespie

The paper surveys spectral properties and open problems in extending well-bounded operator results

Abstract

In this paper we present a new extension of the theory of well-bounded operators to cover operators with complex spectrum. In previous work a new concept of the class of absolutely continuous functions on a nonempty compact subset $\sigma$ of the plane, denoted $AC(\sigma)$, was introduced. An $\AC(\sigma)$ operator is one which admits a functional calculus for this algebra of functions. The class of $AC(\sigma)$ operators includes all of the well-bounded operators and trigonometrically well-bounded operators, as well as all scalar-type spectral operators, but is strictly smaller than Berkson and Gillespie's class of $AC$ operators. This paper develops the spectral properties of $AC(\sigma)$ operators and surveys some of the problems which remain in extending results from the theory of well-bounded operators.