A Convenient Representation Theory of Lorentzian Pseudo-Tensors: P and T in O(1,3)

Abstract

A novel approach to the finite dimensional representation theory of the entire Lorentz group O(1,3) is presented. It is shown how the entire Lorentz group may be understood as a semi-direct product between its identity component and the Klein four group of spacetime reflections: O(1,3) = SO+(1,3) K4. This gives way to a convenient classification of tensors transforming under O(1,3), namely that there are four representations of O(1,3) for each representation of SO+(1,3), and it is shown how the representation theory of the Klein group K4 allows for simple book keeping of the spacetime reflection properties of general Lorentzian tensors, and combinations thereof, with several examples given. There is a brief discussion of the time reversal of the electromagnetic field, concluding in agreement with standard texts such as Jackson, and works by Malament.