English

An Averaging Theorem for Perturbed KdV Equation

Dynamical Systems 2013-01-09 v1

Abstract

We consider a perturbed KdV equation: [\dot{u}+u_{xxx} - 6uu_x = \epsilon f(x,u(\cdot)), \quad x\in \mathbb{T}, \quad\int_\mathbb{T} u dx=0.] For any periodic function u(x)u(x), let I(u)=(I1(u),I2(u),...)R+I(u)=(I_1(u),I_2(u),...)\in\mathbb{R}_+^{\infty} be the vector, formed by the KdV integrals of motion, calculated for the potential u(x)u(x). Assuming that the perturbation ϵf(x,u())\epsilon f(x,u(\cdot)) is a smoothing mapping (e.g. it is a smooth function ϵf(x)\epsilon f(x), independent from uu), and that solutions of the perturbed equation satisfy some mild a-priori assumptions, we prove that for solutions u(t,x)u(t,x) with typical initial data and for 0tϵ10\leqslant t\lesssim \epsilon^{-1}, the vector I(u(t))I(u(t)) may be well approximated by a solution of the averaged equation.

Keywords

Cite

@article{arxiv.1301.1585,
  title  = {An Averaging Theorem for Perturbed KdV Equation},
  author = {Guan Huang},
  journal= {arXiv preprint arXiv:1301.1585},
  year   = {2013}
}

Comments

25 pages

R2 v1 2026-06-21T23:05:58.624Z