Geometry of spacetime propagation of spinning particles: 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

For any (super) group and hence for any geometrical (super) theory Bianchi identities imply that certain 3-forms vanish. In order to perform a systematic analysis of their implications in the presence of constraints one needs a complete basis of independent 3-forms spanning the 3-form linear space.

A spinor Lagrangian invariant under global coordinate, local Lorentz and local chiral SU (n) x SU(n) gauge transformations is presented. The invariance requirement necessitates the introduction of boson fields, and a theory for these fields is then developed by relating them to generalizations of th