The gaussian propagator formalism and the determination of the leading Regge trajectory for phi3 field theory

Abstract

As the number of loops goes to infinity Feynman α-parameters undergo a fixing mechanism which entails a gaussian representation for propagators in scalar field theories. Here, we describe this mechanism in the fullest detail. The fixed values are in fact mean-values which can be determined via consistency conditions. The consistency conditions imply that one α-parameter is integrated in the usual way and the dependence of the mean-values of the other α-parameters on it must be determined. Here we present a method for doing this exactly which requires the solution of an equation system. We present an analytic solution for this equation system in the case of the ladder-graph topology. The Regge behaviour is obtained in a simple way as well as an analytic expression for the leading Regge trajectory. Then, the consistency equations for the two (in the ladder case) independent α-parameters mean-values are solved numerically. Agreement with previous determinations of the intercept α (0) is obtained for α (0) \ 0.3. However, we are able to calculate α (t/m2) for - 3.6 t/m2 1.8 and find that it is close to linear. We consider the massless limit of the theory and find that the α-parameters mean-values and the trajectory α (t) have limits which are independent of the mass, a phenomenon which also occurs for renormalizable theories via the renormalization group equations.

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