KdV on an incoming tide
Abstract
Given smooth step-like initial data V(0,x) on the real line, we show that the Korteweg--de Vries equation is globally well-posed for initial data u(0,x) ∈ V(0,x) + H-1(R). The proof uses our general well-posedness result for exotic spatial asymptotics. As a prerequisite, we show that KdV is globally well-posed for H3(R) perturbations of step-like initial data. In the case V 0, we obtain a new proof of the Bona--Smith theorem using the low-regularity methods that established the sharp well-posedness of KdV in H-1.
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