English

Euclidean Clifford Algebra

Mathematical Physics 2016-08-16 v2 math.MP

Abstract

Let VV be a nn-dimensional real vector space. In this paper we introduce the concept of \emph{euclidean} Clifford algebra C(V,GE)\mathcal{C\ell}(V,G_{E}) for a given euclidean structure on V,V, i.e., a pair (V,GE)(V,G_{E}) where GEG_{E} is a euclidean metric for VV (also called an euclidean scalar product). Our construction of C(V,GE)\mathcal{C\ell}(V,G_{E}) has been designed to produce a powerful computational tool. We start introducing the concept of \emph{multivectors} over V.V. These objects are elements of a linear space over the real field, denoted by V.\bigwedge V. We introduce moreover, the concepts of exterior and euclidean scalar product of multivectors. This permits the introduction of two \emph{contraction operators} on V,\bigwedge V, and the concept of euclidean \emph{interior} algebras. Equipped with these notions an euclidean Clifford product is easily introduced. We worked out with considerable details several important identities and useful formulas, to help the reader to develope a skill on the subject, preparing himself for the reading of the following papers in this series.

Keywords

Cite

@article{arxiv.math-ph/0212043,
  title  = {Euclidean Clifford Algebra},
  author = {V. V. Fernández and A. M. Moya and W. A. Rodrigues},
  journal= {arXiv preprint arXiv:math-ph/0212043},
  year   = {2016}
}

Comments

Latex accent in author(s) was introduced Latex commands in abstract were corrected