Improved algebraic lower bound for the radius of spatial analyticity for the generalized KdV equation

Abstract

We consider the initial value problema (IVP) for the generalized Korteweg-de Vries (gKdV) equation equation cases ∂tu+∂x3u+μ uk∂xu=0, \,\;\; x∈ R, \, t ∈ R,\\ u(x,0)=u0(x), cases equation where u(x,\,t) is a real valued function, u0(x) is a real analytic function, μ= 1 and k≥ 4. We prove that if the initial data u0 has radius of analyticity σ0, then there exists T0>0 such that the radius of spatial analyticity of the solution remains the same in the time interval [-T0, \, T0]. In the defocusing case, for k≥ 4 even, we prove that when the local solution extends globally in time, then for any T≥ T0, the radius of analyticity cannot decay faster than cT-(2kk+4+ε), ε>0 arbitrarily small and c>0 a constant. The result of this work improves the one obtained by Bona et al. in [ J. L. Bona, Z. Gruji\'c, H. Kalisch, Algebraic lower bounds for the uniform radius of spatial analyticity for the generalized KdV equation, Ann Inst. H. Poincar\'e, 22 (2005) 783--797].