Well-posedness for the fifth-order KdV equation in the energy space

Abstract

We prove that the initial value problem (IVP) associated to the fifth order KdV equation equation 05KdV ∂tu-α∂5x u=c1∂xu∂x2u+c2∂x(u∂x2u)+c3∂x(u3), equation where x ∈ R, t ∈ R, u=u(x,t) is a real-valued function and α, \ c1, \ c2, \ c3 are real constants with α ≠ 0, is locally well-posed in Hs( R) for s 2. In the Hamiltonian case ( i.e. when c1=c2), the IVP associated to 05KdV is then globally well-posed in the energy space H2( R).