On Schr\"odinger maps from T1 to S2

Abstract

We prove an estimate for the difference of two solutions of the Schr\"odinger map equation for maps from T1 to S2. This estimate yields some continuity properties of the flow map for the topology of L2(T1,S2), provided one takes its quotient by the continuous group action of T1 given by translations. We also prove that without taking this quotient, for any t>0 the flow map at time t is discontinuous as a map from C∞(T1,S2), equipped with the weak topology of H1/2, to the space of distributions (C∞(T1,3))*.