On non-linear wave equations

## Abstract We present several stability/instability results for the ground‐state standing waves and high‐energy‐bound‐state standing waves for the NLKG, NLS and NLDW equations. At the end of the paper we present a number of open problems. Copyright © 2004 John Wiley & Sons, Ltd.

We prove uniqueness of solutions of the equation W is a spatially homogeneous Wiener process with finite spectral measure, and f , g are locally Lipschitz functions of subcritical growth.

## Abstract We present a global existence theorem for solutions of __u__^__tt__^ − ∂~__i__~__a__~__ik__~ (__x__)∂~__k__~__u__ + u~t~ = ƒ(__t__, __x__, __u__, __u__~__t__~, ∇__u__, ∇__u__~__t__~, ∇^2^__u__), __u__(__t__ = 0) = __u__^0^, __u__(=0)=__u__^1^, __u__(__t, x__), __t__ ⪖ 0, __x__ϵΩ.Ω equal

## 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