Multiple-particle interaction in $1+1$ dimensional lattice model

TL;DR

This study investigates finite volume multi-particle interactions in a 2D lattice $\,\,\,\, ext{phi}^4$ model, demonstrating that spectra from simulations align with analytical solutions, and clarifying the model's scattering properties.

Contribution

It provides a comprehensive numerical analysis of multi-particle spectra in a 2D lattice $\,\, ext{phi}^4$ model, deriving simple analytical three-particle quantization conditions.

Findings

Multi-particle spectra match exact solutions.

Three-particle quantization conditions are analytically simple.

Spectral data confirms the model's scattering parameters.

Abstract

Finite volume multiple-particle interaction is studied in a two-dimensional complex $\phi^4$ lattice model. The existence of analytical solutions to the $\phi^4$ model in two-dimensional space and time makes it a perfect model for the numerical study of finite volume effects of multi-particle interaction. The spectra from multiple particles are extracted from the Monte Carlo simulation on various lattices in several moving frames. The $S$-matrix of multi-particle scattering in $\phi^4$ theory is completely determined by two fundamental parameters: single particle mass and the coupling strength of two-to-two particle interaction. These two parameters are fixed by studying single-particle and two-particle spectra. Due to the absence of the diffraction effect in the $\phi^{4}$ model, three-particle quantization conditions are given in a simple analytical form. The three-particle spectra from simulation show remarkable agreement with the prediction of exact solutions.