The Periodic Cauchy Problem for Novikov's Equation

We study the periodic Cauchy problem for an integrable equation with cubic nonlinearities introduced by Novikov. Like the Camassa-Holm and Degasperis-Procesi equations, Novikov's equation has Lax pair representations and admits peakon solutions, but it has nonlinear terms that are cubic, rather than quadratic. We show the local well-posedness of the problem in Sobolev spaces and existence and uniqueness of solutions for all time using orbit invariants. Furthermore, we prove a Cauchy-Kowalevski type theorem for this equation, which establishes the existence and uniqueness of real analytic solutions.