The profile decomposition for the hyperbolic Schr\"odinger equation

Abstract

In this note, we prove the profile decomposition for hyperbolic Schr\"odinger (or mixed signature) equations on R2 in two cases, one mass-supercritical and one mass-critical. First, as a warm up, we show that the profile decomposition works for the H12 critical problem, which gives a simple generalization of for instance one of the results in Fanelli-Visciglia (2013). Then, we give the derivation of the profile decomposition in the mass-critical case by proving an improved Strichartz estimate. We will use a very similar approach to that laid out in the notes of Killip-Visan (2008), but we are forced to do a double Whitney decomposition to accommodate an extra scaling symmetry that arises in the problem with mixed signature.