A generalized O(2,1) expansion in the space-space region

Following the approach of Jones, Low, and Young, a generalized O(2,l) expansion is developed for amplitudes that have a power bounded growth asymptotically. The expansion, set up in an 0(1, 1) basis, holds in a new kinematical region, where all the incoming and outgoing clusters have space-like 0(2,

We extend a previous treatment [l] of 0(2, 1) expansions for nonsquare-integrable many particle amplitudes to the case where one "incoming" and one "outgoing" cluster have space-like O(2,l) momenta. \* This work is supported in part through funds provided by the Atomic Energy Commission under Contra

The study of systems of singular integral equations of CAUCHY type, of TOEPLITZ and WIENER-HOPF operators leads to the question of existence and representation of generalized factorizations of matrix functions @ in [LP(r, @)I". This yields a corresponding factorization of the basic multiplication or

We extend a previous work [l] on generalized 0(1,2) expansions for power-bounded multiparticle amplitudes. This extension allows one to shift the contour-integral in the O(1, 2) integral representation an arbitrary but finite distance into the left half of the I-plane. The discrete terms in the repr