Convergence problem of the Kawahara equation on the real line

Abstract

In this paper, we consider the convergence problem of the Kawahara equation eqnarray* &&ut+α∂x5u+β∂x3u+∂x(u2)=0 eqnarray* on the real line with rough data. Firstly, by using Strichartz estimates as well as high-low frequency idea, we establish two crucial bilinear estimates, which are just Lemmas 3.1-3.2 in this paper; we also present the proof of Lemma 3.3 which shows that s>-12 is necessary for Lemma 3.2. Secondly, by using frequency truncated technique and high-low frequency technique, we show the pointwise convergence of the Kawahara equation with rough data in Hs()(s≥14); more precisely, we prove eqnarray* &&t→0u(x,t)=u(x,0), a.e. x∈, eqnarray* where u(x,t) is the solution to the Kawahara equation with initial data u(x,0). Lastly, we show eqnarray* &&t→0x∈|u(x,t)-U(t)u0|=0 eqnarray* with rough data in Hs()(s>-12).

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