We generalize the property of complex numbers to be closely related to Euclidean circles by constructing new classes of complex numbers which in an analogous sense are closely related to semi-antinorm circles, ellipses, or functionals which are homogeneous with respect to certain diagonal matrix multiplication. We also extend Euler’s formula and discuss solutions of quadratic equations for the p-norm-antinorm realization of the abstract complex algebraic structure. In addition, we prove an advanced invariance property of certain probability densities
By this paper, our aim is to introduce the Complex Matrices that why we require the complex matrices...
The purpose of this paper is to contribute to development a general theory of dual-complex numbers. ...
This thesis presents various aspects of the general theory of arithmetic of elliptic curves and of c...
In this paper we review the notion of hybrid complex numbers, recently introduced to provide a compr...
In this paper, the Jacobians for complex matrix transformations are derived by means of the exterior...
The geometric approach to generalized complex and three-dimensional hyper-complex numbers and more g...
In this paper, the distributions of the largest and smallest eigenvalues of complex Wishart matrices...
We consider spaces of (square) matrix functions each entry of which is a rational (complex-valued) f...
We show how complex number arithmetic can be performed using matrices for the complex numbers
The complex analysis, also known as theory of analytic functions or complex variable function theory...
Two distinct systems of hypercomplex numbers in n dimensions are introduced in this book, for which ...
In this paper we study the notion of balanced complex polytope as a generalization of a symmetric re...
The main theme of the course is to present some facts on the theory of orthogonal rational functions...
AbstractThis paper brings up to date with new results a matrix trigonometry which I originated about...
The algebra B of bicomplex numbers is viewed as a complexification of theArchimedean f-algebra of hy...
By this paper, our aim is to introduce the Complex Matrices that why we require the complex matrices...
The purpose of this paper is to contribute to development a general theory of dual-complex numbers. ...
This thesis presents various aspects of the general theory of arithmetic of elliptic curves and of c...
In this paper we review the notion of hybrid complex numbers, recently introduced to provide a compr...
In this paper, the Jacobians for complex matrix transformations are derived by means of the exterior...
The geometric approach to generalized complex and three-dimensional hyper-complex numbers and more g...
In this paper, the distributions of the largest and smallest eigenvalues of complex Wishart matrices...
We consider spaces of (square) matrix functions each entry of which is a rational (complex-valued) f...
We show how complex number arithmetic can be performed using matrices for the complex numbers
The complex analysis, also known as theory of analytic functions or complex variable function theory...
Two distinct systems of hypercomplex numbers in n dimensions are introduced in this book, for which ...
In this paper we study the notion of balanced complex polytope as a generalization of a symmetric re...
The main theme of the course is to present some facts on the theory of orthogonal rational functions...
AbstractThis paper brings up to date with new results a matrix trigonometry which I originated about...
The algebra B of bicomplex numbers is viewed as a complexification of theArchimedean f-algebra of hy...
By this paper, our aim is to introduce the Complex Matrices that why we require the complex matrices...
The purpose of this paper is to contribute to development a general theory of dual-complex numbers. ...
This thesis presents various aspects of the general theory of arithmetic of elliptic curves and of c...