A Derivation Of The Scalar Propagator In A Planar Model In Curved Space

Abstract

Given that the free massive scalar propagator in 2 + 1 dimensional Euclidean space is D(x-y)=14π 0.25cm e-m with 2=(x-y)2 we present the counterpart of D(x-y) in curved space with a suitably modified version of the Antonsen - Bormann method instead of the familiar Schwinger - de Witt proper time approach, the metric being defined by the rotating solution of Deser et al. of the Einstein field equations associated with a single massless spinning particle located at the origin.