A trace formula for metric graphs with piecewise constant potentials and multi-mode graphs

TL;DR

This paper extends trace formulas for quantum graphs to include piecewise constant potentials and multiple modes, providing new exact formulas and numerical insights relevant for experimental and theoretical studies.

Contribution

It introduces a novel effective scattering approach to derive exact trace formulas for multi-mode quantum graphs with potentials, broadening the scope beyond single-mode models.

Findings

Derived new trace formulas for multi-mode quantum graphs with potentials

Numerical examples illustrating the applicability of the formulas

Analyzed the influence of evanescent modes above threshold energies

Abstract

We generalize the scattering approach to quantum graphs to quantum graphs with with piecewise constant potentials and multiple excitation modes. The free single-mode case is well-known and leads to the trace formulas of Roth, Kottos and Smilansky. By introducing an effective reduced scattering picture we are able to introduce new exact trace formulas in the more general setting. The latter are derived and discussed in details with some numerical examples for illustration. Our generalization is motivated by both experimental applications and fundamental theoretical considerations. The free single-mode quantum graphs are an extreme idealization of reality that, due to the simplicity of the model allows to understand a large number of generic or universal phenomena. We lift some of this idealization by considering the influence of evanescent modes that only open above threshold energies. How to do this theoretically in a closed model in general is a challenging question of fundamental theoretical interest and we achieve this here for quantum graphs.