New Lower Bounds on the Radius of Spatial Analyticity for the Third-Order Nonlinear Schrödinger Equation
Tegegne Getachew
Journal of Applied Mathematics, 2026, vol. 2026, 1-9
Abstract:
In this paper, we consider the initial value problem associated with the cubic nonlinear Schrödinger equation with third-order dispersion ∂tu+iα∂x2u+β∂x3u+iγu2u=0,x∈℠,t∈℠,ux,0=u0x, where α,β and γ are real constants such that β,γ≠0, u is a complex valued function and the initial data u0 is analytic on ℠and has a uniform radius of analyticity σ0 in the spatial variable. We show the uniform radius of spatial analyticity σT of solutions at time T cannot decay faster than cT−2 for large T. This improves a recent result by Figueira and Panthee, where they established a decay rate of order cT−4+ε for ε>0. We used an approximate conservation law in the modified Gevrey spaces, a contraction mapping argument, space-time estimates and one-dimensional Sobolev embedding to obtain our improved result.
Date: 2026
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Persistent link: https://EconPapers.repec.org/RePEc:hin:jnljam:2851779
DOI: 10.1155/jama/2851779
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