Standing-wave solutions of the Enneper (sine-Gordon) equation

detail why the symplectic property is so important for planar Hamiltonian systems. The question is whether this The phase space of sine-Gordon possesses tori and homoclinic structures. It is important to determine how these structures are superior behavior carries over to high-dimensional syspreser

The standing wave solution to the Schriidinger equation defined in terms of the standing wave Green's function for the full Hamiltonian is discussed. This solution is compared with the more usual standing wave solution. The former is shown to be onehalf the sum of the usual ingoing and outgoing wave

## Abstract We investigate the radially symmetric, nonlinear wave equation equation image and discuss the asymptotic behaviour as r → ∞ of solutions which are __T__‐periodic in time __t__. It is shown that only two possibilities of decay can arise, namely polynomial like __t__^−½(n−1)^ and expone

## Abstract This paper is concerned with the standing wave in coupled non‐linear Klein–Gordon equations. By an intricate variational argument we establish the existence of standing wave with the ground state. Then we derive out the sharp criterion for blowing up and global existence by applying the