In this paper we study the singularities of holomorphic functions of bicomplex variables introduced by G. B. Price (An Introduction to Multicomplex Spaces and Functions, Dekker, New York, 1991). In particular, we use computational algebra techniques to show that even in the case of one bicomplex variable, there cannot be compact singularities. The same techniques allow us to prove a duality theorem for such functions
An algorithm for bivariate singularity analysis is developed. For a wide class of bivariate, rationa...
After reviewing properties of analytic functions on the multicomplex number space ℂk (a commutative ...
The object of this work is to contribute to the development of bicomplex numbers. For this purpose, ...
The purpose of this book is to develop the foundations of the theory of holomorphicity on the ring o...
Abstract: The aim of this paper is presenting a unified study of bicomplex speces and functions. We ...
In this article we present, in a unified manner, a variety of algebraic properties of both bicomplex...
In this paper, we explore for the bicomplex version of the wellknown Hadamard’s three circles ...
International audienceLet D be the two-dimensional real algebra generated by 1 and by a hyperbolic u...
This book provides the foundations for a rigorous theory of functional analysis with bicomplex scala...
Most of what we learned in Calculus I and II (single real variable calculus) can be extended to mult...
This book provides the foundations for a rigorous theory of functional analysis with bicomplex scala...
In this paper we introduce the algebra of bicomplex numbers as a generalization of the field of comp...
An algorithm for bivariate singularity analysis is developed. For a wide class of bivariate, rationa...
It was conjectured that multiplicity of a singularity is bi-Lipschitz invariant. We disprove this co...
4siIn this paper we survey a series of recent developments in the theory of functions of a hypercomp...
An algorithm for bivariate singularity analysis is developed. For a wide class of bivariate, rationa...
After reviewing properties of analytic functions on the multicomplex number space ℂk (a commutative ...
The object of this work is to contribute to the development of bicomplex numbers. For this purpose, ...
The purpose of this book is to develop the foundations of the theory of holomorphicity on the ring o...
Abstract: The aim of this paper is presenting a unified study of bicomplex speces and functions. We ...
In this article we present, in a unified manner, a variety of algebraic properties of both bicomplex...
In this paper, we explore for the bicomplex version of the wellknown Hadamard’s three circles ...
International audienceLet D be the two-dimensional real algebra generated by 1 and by a hyperbolic u...
This book provides the foundations for a rigorous theory of functional analysis with bicomplex scala...
Most of what we learned in Calculus I and II (single real variable calculus) can be extended to mult...
This book provides the foundations for a rigorous theory of functional analysis with bicomplex scala...
In this paper we introduce the algebra of bicomplex numbers as a generalization of the field of comp...
An algorithm for bivariate singularity analysis is developed. For a wide class of bivariate, rationa...
It was conjectured that multiplicity of a singularity is bi-Lipschitz invariant. We disprove this co...
4siIn this paper we survey a series of recent developments in the theory of functions of a hypercomp...
An algorithm for bivariate singularity analysis is developed. For a wide class of bivariate, rationa...
After reviewing properties of analytic functions on the multicomplex number space ℂk (a commutative ...
The object of this work is to contribute to the development of bicomplex numbers. For this purpose, ...