The present work has the scope to show the Laurent Series for quaternionic functions. It will be shown that the Laurent Series for the Quaternionic Case is analogous to the textbook case of Complex Analysis [1]-[2] already well established
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
In this article, we give an approach to Borel functional calculus for quaternionic normal operators,...
AbstractIn this paper we develop the fundamental elements and results of a new theory of regular fun...
In this thesis, we study Quaternionic Analysis, which is the most natural and close generalization o...
The main objective of this article is to give a survey on elementary functions in the context of qua...
In this study, we introduced a quaternion sequence which has not been introduced before. We show tha...
In this paper we introduce a type of Hypercomplex Fourier Series based on Quaternions, and discuss o...
Many properties of complex functions are pretty difficult to be generalized in the field of quaterni...
We will attempt to prove the analogs of three characterizations of Schur functions and the Schwarz-P...
In this study, we introduced a quaternion sequence which has not been introduced before. We show tha...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
This book presents the extensions to the quaternionic setting of some of the main approximation resu...
In [3], [4], [5] the authors offered an alternative definition and theory of regularity for function...
In this paper, we give a generalization of the Fibonacci and Lucas quaternions. We obtain the Binet ...
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
In this article, we give an approach to Borel functional calculus for quaternionic normal operators,...
AbstractIn this paper we develop the fundamental elements and results of a new theory of regular fun...
In this thesis, we study Quaternionic Analysis, which is the most natural and close generalization o...
The main objective of this article is to give a survey on elementary functions in the context of qua...
In this study, we introduced a quaternion sequence which has not been introduced before. We show tha...
In this paper we introduce a type of Hypercomplex Fourier Series based on Quaternions, and discuss o...
Many properties of complex functions are pretty difficult to be generalized in the field of quaterni...
We will attempt to prove the analogs of three characterizations of Schur functions and the Schwarz-P...
In this study, we introduced a quaternion sequence which has not been introduced before. We show tha...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
This book presents the extensions to the quaternionic setting of some of the main approximation resu...
In [3], [4], [5] the authors offered an alternative definition and theory of regularity for function...
In this paper, we give a generalization of the Fibonacci and Lucas quaternions. We obtain the Binet ...
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
In this article, we give an approach to Borel functional calculus for quaternionic normal operators,...