MULTIVECTOR AND EXTENSOR FIELDS ON SMOOTH MANIFOLDS

Author:

MOYA A. M.1,FERNÁNDEZ V. V.2,RODRIGUES W. A.2

Affiliation:

1. Department of Mathematics, University of Antofagasta, Antofagasta, Chile

2. Institute of Mathematics, Statistics and Scientific Computation, IMECC-UNICAMP CP 6065, 13083-859 Campinas, SP, Brazil

Abstract

The main objective of this paper (second in a series of four) is to show how the Clifford and extensor algebras methods introduced in a previous paper of the series are indeed powerful tools for performing sophisticated calculations appearing in the study of the differential geometry of a n-dimensional manifold M of arbitrary topology, supporting a metric field g (of given signature (p,q)) and an arbitrary connection ∇. Specifically, we deal here with the theory of multivector and extensor fields on M. Our approach does not suffer the problems of earlier attempts which are restricted to vector manifolds. It is based on the existence of canonical algebraic structures over the canonical (vector) space associated to a local chart (Uo, ϕo) of a given atlas of M. The key concepts of a-directional ordinary derivatives of multivector and extensor fields are defined and their properties studied. Also, we recall the Lie algebra of smooth vector fields in our formalism, the concept of Hestenes derivatives and present some illustrative applications.

Publisher

World Scientific Pub Co Pte Lt

Subject

Physics and Astronomy (miscellaneous)

Cited by 7 articles. 订阅此论文施引文献 订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献

1. Differential Structure of the Hyperbolic Clifford Algebra;Advances in Applied Clifford Algebras;2014-08-01

2. Introduction;Gravitation as a Plastic Distortion of the Lorentz Vacuum;2010

3. Pair and impair, even and odd form fields, and electromagnetism;Annalen der Physik;2009-12-16

4. Pair and impair, even and odd form fields, and electromagnetism;Annalen der Physik;2009-12-16

5. CLIFFORD AND EXTENSOR CALCULUS AND THE RIEMANN AND RICCI EXTENSOR FIELDS OF DEFORMED STRUCTURES (M, ∇′, η) AND (M, ∇, g);International Journal of Geometric Methods in Modern Physics;2007-11

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