Blow up dynamics for the hyperbolic vanishing mean curvature flow of surfaces asymptotic to Simons cone

Hajer Bahouri, Alaa Marachli, Galina Perelman

Published 2019-02-19Version 1

In this article, we establish the existence of a family of hypersurfaces $(\Gamma (t))_{0< t \leq T}$ which evolve by the vanishing mean curvature flow in Minkowski space and which as $t$ tends to~$0$ blow up towards a hypersurface which behaves like the Simons cone at infinity. This issue amounts to investigate the singularity formation for a second order quasilinear wave equation. Our constructive approach consists in proving the existence of finite time blow up solutions of this hyperbolic equation under the form $u(t,x) \sim t^ {\nu+1} Q\Big(\frac {x} {t^ {\nu+1}} \Big) $, where~$Q$ is a stationary solution and $\nu$ an arbitrary large positive irrational number. Our approach roughly follows that of Krieger, Schlag and Tataru. However contrary to these works, the equation to be handled in this article is quasilinear. This induces a number of difficulties to face.