Nonexistence of small, odd breathers for a class of nonlinear wave equations

Abstract

In this note, we show that for a large class of nonlinear wave equations with odd nonlinearities, any globally defined odd solution which is small in the energy space decays to 0 in the local energy norm. In particular, this result shows nonexistence of small, odd breathers for some classical nonlinear Klein Gordon equations such as the sine Gordon equation and φ4 and φ6 models. It also partially answers a question of Soffer and Weinstein in [p. 19]MR1681113 about nonexistence of breathers for the cubic NLKG in dimension one.