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Commun. Korean Math. Soc. 2025; 40(1): 137-155
Online first article January 17, 2025 Printed January 31, 2025
https://doi.org/10.4134/CKMS.c240098
Copyright © The Korean Mathematical Society.
On dispersive quantization and fractalization for the Kawahara equation
Seongyeon Kim
Jeonju University
In this paper, we investigate the dichotomous behavior of solutions to the Kawahara equation with bounded variation initial data, analogous to the Talbot effect. Specifically, we observe that the solution is quantized at rational times, whereas at irrational times, it is a nowhere continuous differentiable function with a fractal profile. This phenomenon, however, has not been explored for the Kawahara equation, which is a fifth-order KdV type equation. To achieve this, we derive smoothing estimates for the nonlinear Duhamel solution, which, when combined with the known results on the linear solution, provides a mathematical description of the Talbot effect.
Keywords: Fourier transforms, Bourgain spaces
MSC numbers: Primary 42A38; Secondary 42B35
Supported by: This work was supported by the POSCO Science Fellowship of POSCO TJ Park Foundation.
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