On the nonlinear wave equation with time periodic potential

Abstract

It is known that for some time periodic potentials q(t, x) ≥ 0 having compact support with respect to x some solutions of the Cauchy problem for the wave equation ∂t2 u - x u + q(t,x)u = 0 have exponentially increasing energy as t ∞. We show that if one adds a nonlinear defocusing interaction |u|ru, 2≤ r < 4, then the solution of the nonlinear wave equation exists for all t ∈ R and its energy is polynomially bounded as t ∞ for every choice of q. Moreover, we prove that the zero solution of the nonlinear wave equation is instable if the corresponding linear equation has the property mentioned above.