Invariant Forms of the Lorentz Group

Abstract

We study trilinear and multilinear invariant forms for the homogeneous Lorentz group. The residues of these trilinear forms generate particular trilinear forms themselves. They appear also if we sum Taylor expansions partially into a series of expressions each of which is covariant under infinitesimal Lorentz transformations. Multilinear invariant forms are submitted to harmonic analysis in different channels. They are thus expressed by invariant functions. Invariant functions for different channels are related by integral equations involving 6χ‐symbols, 9χ‐symbols etc. as “crossing kernels”. It is shown by construction that all invariant functions and __n__χ‐symbols can be represented as finite sums of Barnes type integrals. As example we analyze explicitly the four‐point Schwinger function of the massless Euclidean Thirring field with arbitrary spin and dimension.