Polynomial bounds on the Sobolev norms of the solutions of the nonlinear wave equation with time dependent potential

Abstract

We consider the Cauchy problem for the nonlinear wave equation utt - x u +q(t, x) u + u3 = 0 with smooth potential q(t, x) ≥ 0 having compact support with respect to x. The linear equation without the nonlinear term u3 and potential periodic in t may have solutions with exponentially increasing as t ∞ norm H1( R3x). In [2] it was established that adding the nonlinear term u3 the H1( R3x) norm of the solution is polynomially bounded for every choice of q. In this paper we show that Hk( R3x) norm of this global solution is also polynomially bounded. To prove this we apply a different argument based on the analysis of a sequence \Yk(nτk)\n = 0∞ with suitably defined energy norm Yk(t) and 0 < τk <1.