Add to ORKGTwo distinct systems of hypercomplex numbers in n dimensions are introduced in this book, for which the multiplication is associative and commutative, and which are rich enough in properties such that exponential and trigonometric forms exist and the concepts of analytic n-complex function, contour integration and residue can be defined. The first type of hypercomplex numbers, called polar hypercomplex numbers, is characterized by the presence in an even number of dimensions greater or equal to 4 of two polar axes, and by the presence in an odd number of dimensions of one polar axis. The other type of hypercomplex numbers exists as a distinct entity only when the number of dimensions n of the space is even, and since the position of a point...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1931.by Hsin P. Soh.M.S
In recent years special hypercomplex Appell polynomials have been introduced by several authors and ...
Since the beginning of the quest of hypercomplex numbers in the late eighteenth century, many hyperc...
The geometric approach to generalized complex and three-dimensional hyper-complex numbers and more g...
The paper is devoted to the theory of n-D complex and hypercomplex analytic signals with emphasis on...
P(論文)For the algebra of hypercomplex numbers in our theory, neither the associative law nor the alte...
P(論文)For the algebra of hypercomplex numbers in our theory, neither the associative law nor the alte...
The purpose of this book is to develop the foundations of the theory of holomorphicity on the ring o...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
Quaternionic theory has greatly been developed in recent years [1-12]. Thus, in our view, the study ...
For the algebra of hypercomplex numbers in our theory, neither the associative law nor the alternati...
The commutative hyper complex field derived in the preceding paper is represented by a matrix. The g...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
In this article we present, in a unified manner, a variety of algebraic properties of both bicomplex...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1931.by Hsin P. Soh.M.S
In recent years special hypercomplex Appell polynomials have been introduced by several authors and ...
Since the beginning of the quest of hypercomplex numbers in the late eighteenth century, many hyperc...
The geometric approach to generalized complex and three-dimensional hyper-complex numbers and more g...
The paper is devoted to the theory of n-D complex and hypercomplex analytic signals with emphasis on...
P(論文)For the algebra of hypercomplex numbers in our theory, neither the associative law nor the alte...
P(論文)For the algebra of hypercomplex numbers in our theory, neither the associative law nor the alte...
The purpose of this book is to develop the foundations of the theory of holomorphicity on the ring o...
Hypercomplex analysis is the extension of complex analysis to higher dimensions where the concept of...
Quaternionic theory has greatly been developed in recent years [1-12]. Thus, in our view, the study ...
For the algebra of hypercomplex numbers in our theory, neither the associative law nor the alternati...
The commutative hyper complex field derived in the preceding paper is represented by a matrix. The g...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
In this article we present, in a unified manner, a variety of algebraic properties of both bicomplex...
A survey of all families of hypercomplex (HC-) numbers is suggested with emphasis on exotic sets. Sy...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1931.by Hsin P. Soh.M.S
In recent years special hypercomplex Appell polynomials have been introduced by several authors and ...