A complex vector is a sum of a vector and a bivector and forms a natural extension of a vector. The complex vectors have certain special geometric properties and considered as algebraic entities. These represent rotations along with specified orientation and direction in space. It has been shown that the association of complex vector with its conjugate generates complex vector space and the corresponding basis elements defined from the complex vector and its conjugate form a closed complex four dimensional linear space. The complexification process in complex vector space allows the generation of higher n-dimensional geometric algebra from (n — 1)-dimensional algebra by considering the unit pseudoscalar identification with square root of mi...
Quantum mechanics often deals with scalar values such as energy or spatial density at x etc. A free ...
This book enables the reader to discover elementary concepts of geometric algebra and its applicatio...
In Part I: Vector Analysis of Spinors, the author studied the geometry of two component spinors as p...
A complex vector is a sum of a vector and a bivector and forms a natural extension of a vector. The ...
The conventional way of introducing relativity when teaching electrodynamics is to leave Gibbs' vect...
We present a comprehensive introduction to spacetime algebra that emphasizes its practicality and po...
Abstract. Complex vector analysis is widely used to analyze continu-ous systems in many disciplines,...
Abstract. Complex vector analysis is widely used to analyze continu-ous systems in many disciplines,...
In 1927, Nobel prize winning physicist, E. Schrodinger, in correspondence with Ehrenfest, wrote the ...
This paper provides derivation of some basic identities for complex four-component vectors de-fined ...
The complex analysis, also known as theory of analytic functions or complex variable function theory...
Maxwell's equations, named after James C. Maxwell, are a U(1) gauge theory describing the interactio...
Bringing geometric algebra to the mainstream of physics pedagogy, this book presents geometric algeb...
A new mathematical structure intended to formalize the classical 3D and 4D vectors is briefly descri...
The matrix form of the Maxwell theory in the form of Riemann – Silberstein – Majorana – Oppenheimera...
Quantum mechanics often deals with scalar values such as energy or spatial density at x etc. A free ...
This book enables the reader to discover elementary concepts of geometric algebra and its applicatio...
In Part I: Vector Analysis of Spinors, the author studied the geometry of two component spinors as p...
A complex vector is a sum of a vector and a bivector and forms a natural extension of a vector. The ...
The conventional way of introducing relativity when teaching electrodynamics is to leave Gibbs' vect...
We present a comprehensive introduction to spacetime algebra that emphasizes its practicality and po...
Abstract. Complex vector analysis is widely used to analyze continu-ous systems in many disciplines,...
Abstract. Complex vector analysis is widely used to analyze continu-ous systems in many disciplines,...
In 1927, Nobel prize winning physicist, E. Schrodinger, in correspondence with Ehrenfest, wrote the ...
This paper provides derivation of some basic identities for complex four-component vectors de-fined ...
The complex analysis, also known as theory of analytic functions or complex variable function theory...
Maxwell's equations, named after James C. Maxwell, are a U(1) gauge theory describing the interactio...
Bringing geometric algebra to the mainstream of physics pedagogy, this book presents geometric algeb...
A new mathematical structure intended to formalize the classical 3D and 4D vectors is briefly descri...
The matrix form of the Maxwell theory in the form of Riemann – Silberstein – Majorana – Oppenheimera...
Quantum mechanics often deals with scalar values such as energy or spatial density at x etc. A free ...
This book enables the reader to discover elementary concepts of geometric algebra and its applicatio...
In Part I: Vector Analysis of Spinors, the author studied the geometry of two component spinors as p...