Asymptotic lower bound for the radius of spatial analtyicity to solutions of KdV equation

Abstract

It is shown that the uniform radius of spatial analyticity σ(t) of solutions at time t to the KdV equation cannot decay faster than |t|-4/3 as |t| ∞ given initial data that is analytic with fixed radius σ0. This improves a recent result of Selberg and Da Silva, where they proved a decay rate of |t|-(4/3 + ) for arbitrarily small positive . The main ingredients in the proof are almost conservation law for the solution to the KdV equation in space of analytic functions and space-time dyadic bilinear L2 estimates associated with the KdV equation.