Nondispersive solutions to the L2-critical half-wave equation

Abstract

We consider the focusing L2-critical half-wave equation in one space dimension i ∂t u = D u - |u|2 u, where D denotes the first-order fractional derivative. Standard arguments show that there is a critical threshold M* > 0 such that all H1/2 solutions with \| u \|L2 < M* extend globally in time, while solutions with \| u \|L2 ≥ M* may develop singularities in finite time. In this paper, we first prove the existence of a family of traveling waves with subcritical arbitrarily small mass. We then give a second example of nondispersive dynamics and show the existence of finite-time blowup solutions with minimal mass \| u0 \|L2 = M*. More precisely, we construct a family of minimal mass blowup solutions that are parametrized by the energy E0 >0 and the linear momentum P0 ∈ . In particular, our main result (and its proof) can be seen as a model scenario of minimal mass blowup for L2-critical nonlinear PDE with nonlocal dispersion.