Unconditional well-posedness for some nonlinear periodic one-dimensional dispersive equations

Abstract

We consider the Cauchy problem for one-dimensional dispersive equations with a general nonlinearity in the periodic setting. Our main hypotheses are both that the dispersive operator behaves for high frequencies as a Fourier multiplier by i ||α , with 1 α 2 , and that the nonlinear term is of the form ∂x f(u) where f is the sum of an entire series with infinite radius of convergence. Under these conditions, we prove the unconditional local well-posedness of the Cauchy problem in Hs(T) for s 1-α2(α+1). This leads to some global existence results above the energy space Hα/2(T) , for α ∈ [2,2].