On the Gevrey regularity of the fifth-order Kadomtsev-Petviashvili-II equation: An improved approach
Abstract
In this paper, we improve and extend the results obtained by Boukarou et al. boukarou1 on the Gevrey regularity of solutions to a fifth-order Kadomtsev-Petviashvili-II equation. We establish Gevrey regularity in the time variable for solutions in 2+1 dimensions, providing a sharper result obtained through a new analytical approach. Assuming that the initial data are Gevrey regular of order σ ≥ 1 in the spatial variables, we prove that the corresponding solution is Gevrey regular of order 5 σ in time. Moreover, we show that the function u(x, y, t), viewed as a function of t, does not belong to Gz for any 1 ≤ z<5 σ. Our proof introduces a new analytical method that establishes a general principle for dispersive equations of the form ∂t u = ∂xα u + P(u), where ∂xα is the highest spatial derivative and P(u) a polynomial in spatial derivatives of total order at most α-1, the solution cannot belong to the Gevrey class Gz in time for any z satisfying 1 ≤ z<α σ.
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