Smooth solutions to the nonlinear wave equation can blow up on Cantor sets

Abstract

We construct $C^\infty$ solutions to the one-dimensional nonlinear wave equation $$u_{tt} - u_{xx} - \tfrac{2(p+2)}{p^2} |u|^p u=0 \quad \text{with} \quad p>0$$ that blow up on any prescribed uniformly space-like $C^\infty$ hypersurface. As a corollary, we show that smooth solutions can blow up (at the first instant) on an arbitrary compact set. We also construct solutions that blow up on general space-like $C^k$ hypersurfaces, but only when $4/p$ is not an integer and $k > (3p+4)/p$