Consideration in the present paper is a mathematical model proposed as an equation of long-crested shallow water waves propagating in one direction with the effect of Earth’s rotation. This model equation is analogous to the Camassa–Holm approximation of the two-dimensional incompressible and irrotational Euler equations, and its solution corresponding to physically relevant initial perturbations is more accurate on a much longer timescale. The effects of the Coriolis force caused by the Earth rotation and nonlocal higher nonlinearities on the blow-up criteria and wave-breaking phenomena in the periodic setting are investigated. Moreover, working with moderate weight functions that are commonly used in time–frequency analysis, some persistence results to the equation are illustrated.
CITATION STYLE
Zhu, M., Liu, Y., & Mi, Y. (2020). Wave-breaking phenomena and persistence properties for the nonlocal rotation-Camassa–Holm equation. Annali Di Matematica Pura Ed Applicata, 199(1), 355–377. https://doi.org/10.1007/s10231-019-00882-5
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