Integral representations combining ladders and crossed-ladders
Abstract
We use the worldline formalism to derive integral representations for three classes of amplitudes in scalar field theory: (i) the scalar propagator exchanging N momenta with a scalar background field (ii) the "half-ladder" with N rungs in x - space (iii) the four-point ladder with N rungs in x - space as well as in (off-shell) momentum space. In each case we give a compact expression combining the N! Feynman diagrams contributing to the amplitude. As our main application, we reconsider the well-known case of two massive scalars interacting through the exchange of a massless scalar. Applying asymptotic estimates and a saddle-point approximation to the N-rung ladder plus crossed ladder diagrams, we derive a semi-analytic approximation formula for the lowest bound state mass in this model.
Cite
@article{arxiv.1405.7770,
title = {Integral representations combining ladders and crossed-ladders},
author = {F. Bastianelli and A. Huet and C. Schubert and R. Thakur and A. Weber},
journal= {arXiv preprint arXiv:1405.7770},
year = {2015}
}
Comments
39 pages, 10 pdf figures