A priori estimates and weak solutions for the derivative nonlinear Schr\"odinger equation on torus below H1/2

Abstract

We propose a priori estimates for a weak solution to the derivative nonlinear Schr\"odinger equation (DNLS) on torus with small L2-norm datum in low regularity Sobolev spaces. These estimates allow us to show the existence of solutions in Hs(T) with some s<1/2 in a relatively weak sense. Furthermore we make some remarks on the error estimates arising from the finite dimensional approximation solutions of DNLS using the Fourier-Lesbesgue type as auxiliary spaces, despite the fact that Nahmod, Oh, Rey-Bullet and Staffilani nors have already seen them.