On the global operator and Fueter mapping theorem for slice polyanalytic functions

Analysis and Applications ◽

10.1142/s0219530520500189 ◽

2020 ◽

pp. 1-24

Author(s):

Daniel Alpay ◽

Kamal Diki ◽

Irene Sabadini

Keyword(s):

Unit Ball ◽

Integral Representations ◽

Axially Symmetric ◽

Regular Functions ◽

Slice Hyperholomorphic Functions ◽

Hyperholomorphic Functions ◽

Global Operator ◽

Polyanalytic Functions

In this paper, we prove that slice polyanalytic functions on quaternions can be considered as solutions of a power of some special global operator with nonconstant coefficients as it happens in the case of slice hyperholomorphic functions. We investigate also an extension version of the Fueter mapping theorem in this polyanalytic setting. In particular, we show that under axially symmetric conditions it is always possible to construct Fueter regular and poly-Fueter regular functions through slice polyanalytic ones using what we call the poly-Fueter mappings. We study also some integral representations of these results on the quaternionic unit ball.

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Quaternionic Fock space on slice hyperholomorphic functions

Filomat ◽

10.2298/fil2004197k ◽

2020 ◽

Vol 34 (4) ◽

pp. 1197-1207

Author(s):

Sanjay Kumar ◽

S.D. Sharma ◽

Khalid Manzoor

Keyword(s):

Unit Ball ◽

Recent Work ◽

Fock Space ◽

Fock Spaces ◽

Slice Regular Functions ◽

Regular Functions ◽

Slice Hyperholomorphic Functions ◽

Hyperholomorphic Functions

In this paper, we define the quaternionic Fock spaces F p? of entire slice hyperholomorphic functions in a quaternionic unit ball B in H: We also study growth estimates and various results of entire slice regular functions in these spaces. The work of this paper is motivated by the recent work of [5] and [26].

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Some Integral Representations of Slice Hyperholomorphic Functions

Moscow Mathematical Journal ◽

10.17323/1609-4514-2014-14-3-473-489 ◽

2014 ◽

Vol 14 (3) ◽

pp. 473-489 ◽

Cited By ~ 1

Author(s):

F. Colombo ◽

J. O. González-Cervantes ◽

I. Sabadini

Keyword(s):

Integral Representations ◽

Slice Hyperholomorphic Functions ◽

Hyperholomorphic Functions

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Slice Hyperholomorphic Functions

SpringerBriefs in Mathematics - Quaternionic de Branges Spaces and Characteristic Operator Function ◽

10.1007/978-3-030-38312-1_3 ◽

2020 ◽

pp. 23-39

Author(s):

Daniel Alpay ◽

Fabrizio Colombo ◽

Irene Sabadini

Keyword(s):

Slice Hyperholomorphic Functions ◽

Hyperholomorphic Functions

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Further properties of the Bergman spaces of slice regular functions

Advances in Geometry ◽

10.1515/advgeom-2015-0022 ◽

2015 ◽

Vol 15 (4) ◽

Cited By ~ 11

Author(s):

Fabrizio Colombo ◽

J. Oscar González-Cervantes ◽

Irene Sabadini

Keyword(s):

Unit Ball ◽

Half Space ◽

Half Plane ◽

Bergman Kernel ◽

Bergman Spaces ◽

Reflection Principle ◽

Slice Regular Functions ◽

Regular Functions ◽

Complex Half Plane ◽

Schwarz Reflection Principle

AbstractWe 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 paperwe 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 suitableweights 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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An axially symmetric forced convection problem

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700023867 ◽

1975 ◽

Vol 20 (1) ◽

pp. 1-17

Author(s):

J. A. Belward

Keyword(s):

Boundary Value Problems ◽

Boundary Value ◽

Convection Heat Transfer ◽

Fundamental Solutions ◽

Integral Representations ◽

Original Equation ◽

Transfer Model ◽

Axially Symmetric ◽

Simple Diffusion ◽

Diffusion Convection

AbstractA simple diffusion-convection heat transfer model is formulated which leads to an axially symmetric partial differential equation. The equation is shown to be closely related to a second one which is adjoint to the original equation in one variable can and be interpreted as a description of another diffusion-convection model. Fundamental solutions of the original equation are constructed and interpreted with reference to both models. Some boundary value problems are solved in series form and integral representations of the solutions are also given. The boundary value problems are shown to be equivalent to an integral equation and the correspondence between the two formulations is understood in terms of the two diffusion-convection problems. A Péclet number is defined in one of the boundary value problems and the behaviour of the solutions is studied for large and small values of this parameter.

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Landau’s theorem for slice regular functions on the quaternionic unit ball

International Journal of Mathematics ◽

10.1142/s0129167x17500173 ◽

2017 ◽

Vol 28 (03) ◽

pp. 1750017 ◽

Cited By ~ 3

Author(s):

Cinzia Bisi ◽

Caterina Stoppato

Keyword(s):

Unit Ball ◽

Unit Disk ◽

Analogous Result ◽

Open Unit ◽

Open Unit Ball ◽

Slice Regular Functions ◽

New Approach ◽

The Real ◽

Regular Functions ◽

Real Algebra

During the development of the theory of slice regular functions over the real algebra of quaternions [Formula: see text] in the last decade, some natural questions arose about slice regular functions on the open unit ball [Formula: see text] in [Formula: see text]. This work establishes several new results in this context. Along with some useful estimates for slice regular self-maps of [Formula: see text] fixing the origin, it establishes two variants of the quaternionic Schwarz–Pick lemma, specialized to maps [Formula: see text] that are not injective. These results allow a full generalization to quaternions of two theorems proven by Landau for holomorphic self-maps [Formula: see text] of the complex unit disk with [Formula: see text]. Landau had computed, in terms of [Formula: see text], a radius [Formula: see text] such that [Formula: see text] is injective at least in the disk [Formula: see text] and such that the inclusion [Formula: see text] holds. The analogous result proven here for slice regular functions [Formula: see text] allows a new approach to the study of Bloch–Landau-type properties of slice regular functions [Formula: see text].

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