Add to ORKGIn this paper the Clifford Algebra is introduced and proposed as analternative to Gibbs' vector algebra as a unifying language for geometricoperations on vectors. Firstly, the algebra is constructed using a quotientof the tensor algebra and then its most important properties are proved,including how it enables division between vectors and how it is connected tothe exterior algebra. Further, the Clifford algebra is shown to naturallyembody the complex numbers and quaternions, whereupon its strength indescribing rotations is highlighted. Moreover, the wedge product, is shown asa way to generalize the cross product and reveal the true nature ofpseudovectors as bivectors. Lastly, we show how replacing the cross productwith the wedge product, wi...
The basis for engineering electromagnetic computations still rely on Gibbs' vector algebra. It is we...
The goal of this book is to present a unified mathematical treatment of diverse problems in mathemat...
The basis for engineering electromagnetic computations still rely on Gibbs' vector algebra. It is we...
In this paper the Clifford Algebra is introduced and proposed as analternative to Gibbs' vector alge...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
International audienceThe multivectorial algebras present yet both an academic and a technological i...
Clifford algebras have been studied for many years and their algebraic properties are well known. I...
Abstract Given a quadratic form on a vector space, the geometric algebra of the corresponding pseudo...
Quaternions are a type of hypercomplex numbers. Unit quaternions, which describe rotations, were cal...
The Clifford algebra of a n-dimensional Euclidean vector space provides a general language comprisin...
The goals of this paper are to provide an introduction to vector, exterior and Clifford algebra and ...
A straightforward introduction to Clifford algebras, providing the necessary background material and...
The basis for engineering electromagnetic computations still rely on Gibbs' vector algebra. It is we...
The goal of this book is to present a unified mathematical treatment of diverse problems in mathemat...
The basis for engineering electromagnetic computations still rely on Gibbs' vector algebra. It is we...
In this paper the Clifford Algebra is introduced and proposed as analternative to Gibbs' vector alge...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
Geometric algebra (also known as Clifford algebra) is a powerful mathematical tool that offers a nat...
International audienceThe multivectorial algebras present yet both an academic and a technological i...
Clifford algebras have been studied for many years and their algebraic properties are well known. I...
Abstract Given a quadratic form on a vector space, the geometric algebra of the corresponding pseudo...
Quaternions are a type of hypercomplex numbers. Unit quaternions, which describe rotations, were cal...
The Clifford algebra of a n-dimensional Euclidean vector space provides a general language comprisin...
The goals of this paper are to provide an introduction to vector, exterior and Clifford algebra and ...
A straightforward introduction to Clifford algebras, providing the necessary background material and...
The basis for engineering electromagnetic computations still rely on Gibbs' vector algebra. It is we...
The goal of this book is to present a unified mathematical treatment of diverse problems in mathemat...
The basis for engineering electromagnetic computations still rely on Gibbs' vector algebra. It is we...