The sine-Gordon Model and its Applications From Pendula and Josephson Junctions to Gravity and High-Energy Physics / [electronic resource] : edited by Jes�us Cuevas-Maraver, Panayotis G. Kevrekidis, Floyd Williams. - XIII, 263 p. 74 illus., 35 illus. in color. online resource. - Nonlinear Systems and Complexity, 10 2195-9994 ; . - Nonlinear Systems and Complexity, 10 .

From the Contents: The sine-Gordon Model: General Background, Physical Motivations, Inverse Scattering, and Solitons -- Sine-Gordon Equation: From Discrete to Continuum -- Soliton Collisions -- The Traveling Kink Problem: Radiation Phenomena, Resonances, Pinning and How to Avoid It.

The sine-Gordon model is a ubiquitous model of Mathematical Physics with a wide range of applications extending from coupled torsion pendula and Josephson junction arrays to gravitational and high-energy physics models. The purpose of this book is to present a summary of recent developments in this field, incorporating both introductory background material, but also with a strong view towards modern applications, recent experiments, developments regarding the existence, stability, dynamics and asymptotics of nonlinear waves that arise in the model. This book is of particular interest to a wide range of researchers in this field, but serves as an introductory text for young researchers and students interested in the topic. The book consists of well-selected thematic chapters on diverse mathematical and physical aspects of the equation carefully chosen and assigned.

9783319067223

10.1007/978-3-319-06722-3 doi


Physics.
Mathematical physics.
Mechanics.
Astrophysics.
Nuclear physics.
Physics.
Theoretical, Mathematical and Computational Physics.
Mathematical Physics.
Mechanics.
Astrophysics and Astroparticles.
Particle and Nuclear Physics.

QC19.2-20.85

530.1