Add to ORKGSince the beginning of the quest of hypercomplex numbers in the late eighteenth century, many hypercomplex number systems have been proposed but none of them succeeded in extending the concept of complex numbers to higher dimensions. This paper provides a definitive solution to this problem by defining the truly hypercomplex numbers of dimension N ≥ 3. The secret lies in the definition of the multiplicative law and its properties. This law is based on spherical and hyperspherical coordinates. These numbers which I call spherical and hyperspherical hypercomplex numbers define Abelian groups over addition and multiplication. Nevertheless, the multiplicative law generally does not distribute over addition, thus the set of these numbers equippe...
The method of obtaining the set of noncanonical hypercomplex number systems by conversion of infinit...
<p>New title: Construction of the Transcomplex Numbers From the Complex Numbers.</p> <p>Transcomplex...
These notes describe some links between the group SL2(R), the Heisenberg group and hypercomplex numb...
Two distinct systems of hypercomplex numbers in n dimensions are introduced in this book, for which ...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1931.by Hsin P. Soh.M.S
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
Any point of the real line is the real number image; any point of the ℝ2 plane is the complex number...
In this article we present, in a unified manner, a variety of algebraic properties of both bicomplex...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
In a publication about the hypercomplex number in a three-dimensional space, we defined a hypercompl...
This paper proposes an extension of the complex numbers, adding further imaginary units and preservi...
Quantum theory (QT) which is one of the basic theories of physics, namely in terms of ERWIN SCHRÖDI...
Quantum theory (QT) which is one of the basic theories of physics, namely in terms of ERWIN SCHRÖDI...
The purpose of this book is to develop the foundations of the theory of holomorphicity on the ring o...
The method of obtaining the set of noncanonical hypercomplex number systems by conversion of infinit...
<p>New title: Construction of the Transcomplex Numbers From the Complex Numbers.</p> <p>Transcomplex...
These notes describe some links between the group SL2(R), the Heisenberg group and hypercomplex numb...
Two distinct systems of hypercomplex numbers in n dimensions are introduced in this book, for which ...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1931.by Hsin P. Soh.M.S
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
Any point of the real line is the real number image; any point of the ℝ2 plane is the complex number...
In this article we present, in a unified manner, a variety of algebraic properties of both bicomplex...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
In a publication about the hypercomplex number in a three-dimensional space, we defined a hypercompl...
This paper proposes an extension of the complex numbers, adding further imaginary units and preservi...
Quantum theory (QT) which is one of the basic theories of physics, namely in terms of ERWIN SCHRÖDI...
Quantum theory (QT) which is one of the basic theories of physics, namely in terms of ERWIN SCHRÖDI...
The purpose of this book is to develop the foundations of the theory of holomorphicity on the ring o...
The method of obtaining the set of noncanonical hypercomplex number systems by conversion of infinit...
<p>New title: Construction of the Transcomplex Numbers From the Complex Numbers.</p> <p>Transcomplex...
These notes describe some links between the group SL2(R), the Heisenberg group and hypercomplex numb...