Improved refined bilinear estimates and well-posedness for generalized KdV type equations on R
Abstract
We study the Cauchy problem for one-dimensional dispersive equations posed on R , under the hypotheses that the dispersive operator behaves, for high frequencies, as a Fourier multiplier by i ||α with 1 α 2 , and that the nonlinear term is of the form ∂x f(u) where f is a real analytic function satisfying certain conditions. We prove the unconditional local well-posedness of the Cauchy problem in Hs(R) for s 5-2α4 whenever 1 α<32 , and for s>12 whenever α∈ [32,2] . This result is optimal in the case α 32 in view of the restriction s>12 required for the continuous embedding Hs(R) L∞(R) . The main novelty of this work, compared to our previous studies, is an improvement of the refined linear and bilinear estimates on R . Our local well-posedness results enable us to derive global existence of solutions for α ∈ [54,2] .
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