Optimal Decay Estimate and Asymptotic Profile for Solutions to the Generalized Zakharov-Kuznetsov-Burgers Equation in 2D

Abstract

We consider the Cauchy problem for the generalized Zakharov-Kuznetsov-Burgers equation in 2D. This is one of the nonlinear dispersive-dissipative equations, which has a spatial anisotropic dissipative term -μ uxx. In this paper, we prove that the solution to this problem decays at the rate of t-34 in the L∞-sense, provided that the initial data u0(x, y) satisfies u0∈ L1(R2) and some appropriate regularity assumptions. Moreover, we investigate the more detailed large time behavior and obtain a lower bound of the L∞-norm of the solution. As a result, we prove that the given decay rate t-34 of the solution to be optimal. Furthermore, combining the techniques used for the parabolic equations and for the Schrodinger equation, we derive the explicit asymptotic profile for the solution.

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