Neumann boundary controllability of the Korteweg-de Vries equation on a bounded domain

Abstract

In this paper we study boundary controllability of the Korteweg-de Vries (KdV) equation posed on a finite domain (0,L) with the Neumann boundary conditions: ut+ux+uux+uxxx=0 in (0,L)x(0,T), uxx(0,t)=0, ux(L,t)=h(t), uxx(L,t)=0 in (0,T), u(x,0)=u0(x) in (0,L). We show that the associated linearized system ut+(1+β)ux+uxxx=0 in (0,L)x(0,T), uxx(0,t)=0, ux(L,t)=h(t), uxx(L,t)=0 in (0,T), u(x,0)=u0(x) in (0,L) is exactly controllable if and only if the length L of the spatial domain (0,L) does not equal to -1 or does not belong to set Rβ:=2π3(1+β)k2+kl+l2:k,l∈Nkπ1+β:k∈N and the nonlinear system is locally exactly controllable around a constant steady state β if the associated linear system is exactly controllable.