On Spinors Transformations

Abstract

We begin showing that for even dimensional vector spaces V all automorphisms of their Clifford algebras are inner. So all orthogonal transformations of V are restrictions to V of inner automorphisms of the algebra. Thus under orthogonal transformations P and T - space and time reversal - all algebra elements, including vectors v and spinors , transform as v x v x-1 and x x-1 for some algebra element x. We show that while under combined PT spinor x x-1 remain in its spinor space, under P or T separately goes to a 'different' spinor space and may have opposite chirality. We conclude with a preliminary characterization of inner automorphisms with respect to their property to change, or not, spinor spaces.