Nonlocal Rarita-Schwinger theory

Abstract

In this paper, one constructs a nonlocal extension of the Rarita-Schwinger theory for spin-3/2 fermions. Two classes of analytic form factors are considered: scalar form factors f() and Dirac-operator form factors f(∂). The massless theory is treated together with a covariant nonlocal gauge fixing, which allows the propagator to be written directly in terms of the spin-3/2 projector. In the massive theory, we show that the free Rarita-Schwinger constraints remain intact for analytic form factors, so that the unphysical spin-1/2 sector does not become dynamical. For f() the tensor-spinor structure of the propagator is the same as in the local theory, while the pole equation is deformed by the scalar form factor. For f(∂) the physical modes obey a nonlocal Dirac-type equation, leading to modified dispersion relations that can be written explicitly for exponential form factors. We discuss the conditions under which the construction is ghost-free at the free level and identify the natural limitations that must be addressed before interactions are introduced.