Well-posedness for a higher order water wave model on modulation spaces

Abstract

Considered in this work is the initial value problem (IVP) associated to a higher order water wave model equation* cases ηt+ηx-γ1 ηxxt+γ2ηxxx+δ1 ηxxxxt+δ2ηxxxxx+32η ηx+γ (η2)xxx-748(ηx2)x-18(η3)x=0,\\ η(x,0) = η0(x). cases equation* The main interest is in addressing the well-posedness issues of the IVP when the given initial data are considered in the modulation space Ms2,p(R) or the Lp-based Sobolev spaces Hs,p(R), 1≤ p<∞. We derive some multilinear estimates in these spaces and prove that the above IVP is locally well-posed for data in Ms2,p(R) whenever s>1 and p≥ 1, and in Hs,p(R) whenever p∈ [1,∞) and s≥ \ 1p+12, 1 \. We also use a combination of high-low frequency technique and an a priori estimate, and prove that the local solution with data in the modulation spaces Ms2,p(R) can be extended globally to the time interval [0, T] for any given T1 if 1≤ 32-1p <s<2 or if (s,p)∈ [2, ∞]× [2, ∞].