Exploring High Multiplicity Amplitudes: The QM Analogue of the Spontaneously Broken Case

Abstract

Calculations of high multiplicity Higgs amplitudes exhibit a rapid growth that may signal an end of perturbative behavior or even the need for new physics phenomena. As a step towards this problem we consider the quantum mechanical equivalent of 1 n scattering amplitudes in a spontaneously broken φ4-theory by extending our previous results on the quartic oscillator with a single minimum to transitions n x 0 in the symmetric double-well potential with quartic coupling λ. Using recursive techniques to high order in perturbation theory, we argue that these transitions are of exponential form n x 0 ( F (λ n) / λ ) in the limit of large n and λ n fixed. We apply the methods of "exact perturbation theory" put forward by Serone et al. to obtain the exponent F and investigate its structure in the regime where tree-level perturbation theory violates unitarity constraints. We find that the resummed exponent is in agreement with unitarity and rigorous bounds derived by Bachas.