Add to ORKGNotions of a “holomorphic ” function theory for functions of a split-quaternionic variable have been of recent interest. We describe two found in the literature and show that one notion encompasses a small class of functions, while the other gives a richer collection. In the second instance, we describe a simple subclass of functions and give two examples of an analogue of the Cauchy-Kowalewski extension in this context.
4siIn this paper we survey a series of recent developments in the theory of functions of a hypercomp...
In this thesis I've explored the theory of quaternionic slice regular functions. More precisely I've...
AbstractA new theory of regular functions over the skew field of Hamilton numbers (quaternions) and ...
AbstractIn this paper we develop the fundamental elements and results of a new theory of regular fun...
In [3], [4], [5] the authors offered an alternative definition and theory of regularity for function...
I introduce a notion of quaternionic regularity using techniques based on hypertwined analysis, a re...
This book presents the extensions to the quaternionic setting of some of the main approximation resu...
Let Ω ⊆ C2. We prove that there exist differential operators T and N, with complex coefficients, suc...
In this thesis, we study Quaternionic Analysis, which is the most natural and close generalization o...
The theory of mathematical analysis over split quaternions is formulated in a closest possible analo...
The theory of regular quaternionic functions of a reduced quaternionic variable is a 3-dimensional g...
For functions of two quaternionic variables that are regular in the sense of Fueter, we establish a ...
The regularity of a quaternionic function is reinterpreted through a new canonical decomposition of ...
Abstract. In some recent works we have developed a new functional calculus for bounded and unbounde...
In this note we prove the Bieberbach conjecture for some classes of quaternionic functions, includi...
4siIn this paper we survey a series of recent developments in the theory of functions of a hypercomp...
In this thesis I've explored the theory of quaternionic slice regular functions. More precisely I've...
AbstractA new theory of regular functions over the skew field of Hamilton numbers (quaternions) and ...
AbstractIn this paper we develop the fundamental elements and results of a new theory of regular fun...
In [3], [4], [5] the authors offered an alternative definition and theory of regularity for function...
I introduce a notion of quaternionic regularity using techniques based on hypertwined analysis, a re...
This book presents the extensions to the quaternionic setting of some of the main approximation resu...
Let Ω ⊆ C2. We prove that there exist differential operators T and N, with complex coefficients, suc...
In this thesis, we study Quaternionic Analysis, which is the most natural and close generalization o...
The theory of mathematical analysis over split quaternions is formulated in a closest possible analo...
The theory of regular quaternionic functions of a reduced quaternionic variable is a 3-dimensional g...
For functions of two quaternionic variables that are regular in the sense of Fueter, we establish a ...
The regularity of a quaternionic function is reinterpreted through a new canonical decomposition of ...
Abstract. In some recent works we have developed a new functional calculus for bounded and unbounde...
In this note we prove the Bieberbach conjecture for some classes of quaternionic functions, includi...
4siIn this paper we survey a series of recent developments in the theory of functions of a hypercomp...
In this thesis I've explored the theory of quaternionic slice regular functions. More precisely I've...
AbstractA new theory of regular functions over the skew field of Hamilton numbers (quaternions) and ...