On the algebraic lower bound for the radius of spatial analyticity for the Zakharov-Kuznetsov and modified Zakharov-Kuznetsov equations
Abstract
We consider the initial value problem (IVP) for the 2D generalized Zakharov-Kuznetsov (ZK) equation equation cases ∂tu+∂x u+μ ∂xuk+1=0, \,\;\; (x, y) ∈ R2, \, t ∈ R,\\ u(x,y,0)=u0(x,y), cases equation where =∂x2+∂y2, μ= 1, k=1,2 and the initial data u0 is real analytic in a strip around the x-axis of the complex plane and have radius of spatial analyticity σ0. For both k=1 and k=2 we prove that there exists T0>0 such that the radius of spatial analyticity of the solution remains the same in the time interval [-T0, T0]. We also consider the evolution of the radius of spatial analyticity when the local solution extends globally in time. For the Zakharov-Kuznetsov equation (k=1), we prove that, in both focusing (μ=1) and defocusing (μ=-1) cases, and for any T> T0, the radius of analyticity cannot decay faster than cT-4+ε, ε>0, c>0. For the modified Zakharov-Kuznetsov equation (k=2) in the defocusing case (μ=-1), we prove that the radius of spatial analyticity cannot decay faster than cT-43, c>0, for any T>T0. These results on the algebraic lower bounds for the evolution of the radius of analyticity improve the ones obtained by Shan and Zhang in [J. Math. Anal. Appl., 501 (2021) 125218] and by Quian and Shan in [Nonlinear Analysis, 235 (2023) 113344] where the authors have obtained lower bounds involving exponential decay.
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