Kink-antikink soliton solutions of the nonlinear Klein-Gordon equation on branched structures

TL;DR

This paper studies kink-antikink soliton solutions of the nonlinear Klein-Gordon equation on branched structures, providing exact and numerical solutions that exhibit reflectionless propagation and analyzing their behavior on complex graph topologies.

Contribution

It introduces a method to construct and analyze soliton solutions on branched graph structures with specific boundary conditions, extending previous work to more complex topologies.

Findings

Reflectionless propagation of kink-antikink solitons demonstrated

Exact and numerical solutions are consistent and conserve energy

Impact of nonlinearity parameters on soliton behavior analyzed

Abstract

In this paper, we investigate the nonlinear Klein-Gordon equation on a metric star graph with three semi-infinite bonds. At the branching point, we impose a weighted continuity condition and a generalized weighted Kirchhoff condition for the derivatives of the wave function. By employing both analytical methods and numerical techniques, we construct exact and numerical soliton solutions that satisfy the vertex conditions and conserve energy and momentum. The results of analytic calculations are confirmed through numerical experiments, which demonstrate reflectionless propagation of kink-antikink soliton solutions. We compute and analyze the reflection coefficient, study the impact of various nonlinearity parameters, and further extend the formulation to other graph topologies, such as tree and loop graphs.