For EDITORS

For READERS

All Issues

Vol.15, 2025
Vol.14, 2024
Vol.10, 2020
Vol.9, 2019
Vol.8, 2018
Vol.7, 2017
Vol.6, 2016
Vol.5, 2015
Vol.4, 2014
Vol.3, 2013
Vol.2, 2012
Vol.1, 2011
Volume 14, Number 5, 2024, Pages -                                                                DOI:10.11948/JAAC-2022-0477
The smooth solutions of a class of coupled KdV equations.
Qi Guo
Keywords:KdV equations, periodic solutions, conserved quantities.
Abstract:
      This paper is devoted to the study of the periodic initial boundary value problem and Cauchy problem for the coupled KdV equations. By the Galerkin method and sequential approximation, we get a seies of priori estimates and establish the existence of classical local solution to the periodic problem for the system. Then we obtain the existence and uniqueness of global smooth solution when the coefficients of the system satisfy certain conditions by energy menthod, conserved quantities and nonconservative quatity I(u,v).
PDF      Download reader