The Dirac-Hestenes Lagrangian

Abstract

We discuss the variational principle within Quantum Mechanics in terms of the noncommutative even Space Time sub-Algebra, the Clifford -algebra Cl1,3+. A fundamental ingredient, in our multivectorial algebraic formulation, is the adoption of a -complex geometry, span \1,γ21 \, γ21 ∈ Cl1,3+. We derive the Lagrangian for the Dirac-Hestenes equation and show that such Lagrangian must be mapped on F, where F denotes an -algebra of functions.

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