A Clifford Bundle Approach to the Wave Equation of a Spin 1/2 Fermion in the de Sitter Manifold

Abstract

In this paper we give a Clifford bundle motivated approach to the wave equation of a free spin 1/2 fermion in the de Sitter manifold, a brane with topology M=S0(4,1)/S0(3,1) living in the bulk spacetime R4,1=(M=R5,g) and equipped with a metric field g:=-ig% with i:M→M being the inclusion map. To obtain the analog of Dirac equation in Minkowski spacetime in the structure M we appropriately factorize the two Casimir invariants C1 and C2 of the Lie algebra of the de Sitter group using the constraint given in the linearization of C2 as input to linearize C1. In this way we obtain an equation that we called DHESS1,which in previous studies by other authors was simply postulated..Next we derive a wave equation (called DHESS2) for a free spin 1/2 fermion in the de Sitter manifold using a heuristic argument which is an obvious generalization of a heuristic argument (described in detail in Appendix D) permitting a derivation of the Dirac equation in Minkowski spacetime and which shows that such famous equation express nothing more than the fact that the momentum of a free particle is a constant vector field over timelike \ integral curves of a given velocity field. It is a remarkable fact that DHESS1and DHESS2\ coincide. One of the main ingredients in our paper is the use of the concept of Dirac-Hestenes spinor fields. Appendices B and C recall this concept and its relation with covariant Dirac spinor fields usualy used by physicists.