Polyakov spin factors and Laplacians on homogeneous spaces: T. Jaroszewicz and P. S. Kurzepa. Department of Physics, University of California, Los Angeles, Los Angeles, California 90024

We develop and unify two complementary descriptions of propagation of spinning particles: the directed random walk representation and the "spin factor" approach. Working in an arbitrary number of dimen-506

We present a complete and a simplified discussion of the scattering of acoustic, electromagnetic and earthquake SH waves by various shapes such as in&rite cylinders, strips, slits, cracks, cavities, and semiinfinite planes. Formulas are derived for the velocity potentials, electromagnetic fields, di

We quantize area-preserving maps M of the phase plane q,p by devising a unitary operator ir transforming states / 4") into 1 $,,+l). The result is a system with one degree of freedom q on which to study the quantum implications of generic classical motion, including stochasticity. We derive exact ex