Breather solutions of nonlinear Klein-Gordon equations are represented numerically as time-evolving trajectories in finite-dimensional dynamical systems, with rotational motion around fixed points realizing the breather behavior.
Spectral Methods. Fundamen-tals in Single Domains
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Time-dependent finite-dimensional dynamical system representation of breather solutions
Breather solutions of nonlinear Klein-Gordon equations are represented numerically as time-evolving trajectories in finite-dimensional dynamical systems, with rotational motion around fixed points realizing the breather behavior.