J. Oscar González-Cervantes scite author profile

Slice monogenic functions have had a rapid development in the past few years. One of the main properties of such functions is that they allow the definition of a functional calculus, called S-functional calculus, for (bounded or unbounded) noncommuting operators.\ud In the literature there exist two different definitions of slice monogenic functions that turn out to be equivalent under suitable conditions on the domains on which they are defined.\ud Both the existing definitions are based on the validity of the Cauchy-Riemann equations in a suitable sense. The aim of this paper is to prove that slice monogenic functions belong to the kernel of a global operator G.\ud Despite the fact that G has non constant coefficients, we are able to prove that a subclass of functions in the kernel of G have a Cauchy formula.\ud Moreover, we will study some relations among the three classes of functions and we show that the kernel of the operator G strictly contains the functions given by the other two definitions

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On Two Approaches to the Bergman Theory for Slice Regular Functions

Colombo

González-Cervantes²,

Luna-Elizarrarás³

et al. 2013

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The C-property for slice regular functions and applications to the Bergman space

Colombo

González-Cervantes

Sabadini

2013

Complex Variables and Elliptic Equations

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This paper has a twofold purpose: on one hand we deepen the study of slice regular functions by studying their behavior with respect to the so-called C-property and anti-C-property. We show that, for any fixed basis of the algebra of quaternions H any slice regular function decomposes into the sum of four slice regular components each of them satisfying the C-property. Then, we will use these results to show a reproducing property of the Bergman kernels of the second kind.

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Further properties of the Bergman spaces of slice regular functions

Colombo

González-Cervantes

Sabadini

2015

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In this paper we continue the study of Bergman theory for the class of slice regular functions. In the slice regular setting there are two possibilities to introduce the Bergman spaces, that are called of the first and of the second kind. In this paper we mainly consider the Bergman theory of the second kind, by providing an explicit description of the Bergman kernel in the case of the unit ball and of the half space. In the case of the unit ball, we study the Bergman-Sce transform. We also show that the two Bergman theories can be compared only if suitable weights are taken into account. Finally, we use the Schwarz reflection principle to relate the Bergman kernel with its values on a complex half plane.

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On slice biregular functions and isomorphisms of Bergman spaces

Colombo

González-Cervantes²,

Sabadini

2012

Complex Variables and Elliptic Equations

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