On Singularity formation for the L2-critical Boson star equation

Abstract

We prove a general, non-perturbative result about finite-time blowup solutions for the L2-critical boson star equation i∂t u = -+m2 \, u - (|x|-1 |u|2) u in 3 space dimensions. Under the sole assumption that the solution blows up in H1/2 at finite time, we show that u(t) has a unique weak limit in L2 and that |u(t)|2 has a unique weak limit in the sense of measures. Moreover, we prove that the limiting measure exhibits minimal mass concentration. A central ingredient used in the proof is a "finite speed of propagation" property, which puts a strong rigidity on the blowup behavior of u. As the second main result, we prove that any radial finite-time blowup solution u converges strongly in L2 away from the origin. For radial solutions, this result establishes a large data blowup conjecture for the L2-critical boson star equation, similar to a conjecture which was originally formulated by F. Merle and P. Raphael for the L2-critical nonlinear Schr\"odinger equation in [CMP 253 (2005), 675-704]. We also discuss some extensions of our results to other L2-critical theories of gravitational collapse, in particular to critical Hartree-type equations.