Optimal bounds for the growth of Sobolev norms of solutions of a quadratic Szego equation

Abstract

In this paper, we study a quadratic equation on the one-dimensional torus : i ∂t u = 2J(|u|2)+Ju2, u(0, ·)=u0, where J=∫T|u|2u ∈C has constant modulus, and is the Szego projector onto functions with nonnegative frequencies. Thanks to a Lax pair structure, we construct a flow on BMO(T) Im which propagates Hs regularity for any s>0, whereas the energy level corresponds to s=1/2. Then, for each s>1/2, we exhibit solutions whose Hs norm goes to +∞ exponentially fast, and we show that this growth is optimal.