Properties of a polyanalytic functional calculus on the $S$-spectrum

TL;DR

This paper develops a polyanalytic functional calculus on the $S$-spectrum, extending the Fueter mapping theorem by applying the operator $ar{D}$ to obtain polyanalytic functions, and explores its key properties and applications.

Contribution

It introduces a novel polyanalytic functional calculus based on the factorization of the Laplace operator, expanding the $S$-functional calculus framework.

Findings

Established integral representation for polyanalytic functions

Proved a resolvent equation for the calculus

Constructed Riesz projectors within this framework

Abstract

The Fueter mapping theorem gives a constructive way to extend holomorphic functions of one complex variable to monogenic functions, i.e., null solutions of the generalized Cauchy-Riemann operator in $\mathbb{R}^4$, denoted by $\mathcal{D}$. This theorem is divided in two steps. In the first step a holomorphic function is extended to a slice hyperholomorphic function. The Cauchy formula for these type of functions is the starting point of the $S$-functional calculus. In the second step a monogenic function is obtained by applying the Laplace operator in four real variables, namely $ \Delta$, to a slice hyperholomorphic function. The polyanalytic functional calculus, that we study in this paper, is based on the factorization of $\Delta= \mathcal{D} \mathcal{\overline{D}}$. Instead of applying directly the Laplace operator to a slice hyperholomorphic function we apply first the operator $ \mathcal{\overline{D}}$ and we get a polyanalytic function of order 2, i..e, a function that belongs to the kernel of $ \mathcal{D}^2$. We can represent this type of functions in an integral form and then we can define the polyanalytic functional calculus on $S$-spectrum. The main goal of this paper is to show the principal properties of this functional calculus. In particular, we study a resolvent equation suitable for proving a product rule and generate the Riesz projectors.