The fine structure of the spectral theory on the $S$-spectrum in dimension five

TL;DR

This paper explores the detailed structure of spectral theories related to the $S$-spectrum in five dimensions, focusing on the extension of holomorphic functions to hyperholomorphic functions and their associated functional calculi.

Contribution

It characterizes the various factorizations of the extension operator from slice hyperholomorphic to monogenic functions in five dimensions, revealing different function spaces and calculi.

Findings

Identifies multiple factorizations of the extension operator.

Describes the associated function spaces and calculi in five dimensions.

Provides a framework applicable to higher dimensions with different orders.

Abstract

Holomorphic functions play a crucial role in operator theory and the Cauchy formula is a very important tool to define functions of operators. The Fueter-Sce-Qian extension theorem is a two steps procedure to extend holomorphic functions to the hyperholomorphic setting. The first step gives the class of slice hyperholomorphic functions; their Cauchy formula allows to define the so-called $S$-functional calculus for noncommuting operators based on the $S$-spectrum. In the second step this extension procedure generates monogenic functions; the related monogenic functional calculus, based on the monogenic spectrum, contains the Weyl functional calculus as a particular case. In this paper we show that the extension operator from slice hyperholomorphic functions to monogenic functions admits various possible factorizations that induce different function spaces. The integral representations in such spaces allows to define the associated functional calculi based on the $S$-spectrum. The function spaces and the associated functional calculi define the so called {\em fine structure of the spectral theories on the $S$-spectrum}. Among the possible fine structures there are the harmonic and poly-harmonic functions and the associated harmonic and poly-harmonic functional calculi. The study of the fine structures depends on the dimension considered and in this paper we study in detail the case of dimension five, and we describe all of them. The five-dimensional case is of crucial importance because it allows to determine almost all the function spaces will also appear in dimension greater than five, but with different orders.