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Strichartz and Multi-linear Estimates for the One-dimensional Periodic Dysthe equation

Published 17 Dec 2021 in math.AP | (2112.12734v1)

Abstract: This paper presents Strichartz estimates for the linearized 1D periodic Dysthe equation on the torus, namely estimate of the $L6_{x,t}(\mathbb{T}2)$ norm of the solution in terms of the initial data, and estimate of the $L4_{x,t}(\mathbb{T}2)$ norm in terms of the Bourgain space norm. The paper also presents other results such as bilinear and trilinear estimates pertaining to local well-posedness of the 1-dimensional periodic Dysthe equation in a suitable Bourgain space, and ill-posedness results in Sobolev spaces.

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