Past

Finite time blow up and lifespan estimate for semilinear wave equations in Schwarzschild spacetime

Abstract

We study the semilinear wave equation with power type nonlinearity and small initial data in Schwarzschild spacetime. If the nonlinear exponent $p$ satisfies $2\le p\le1+\sqrt 2$, we establish the blow-up result and lifespan estimate. The key novelty is that the compact support of the initial data can be close to the event horizon. By combining the global existence result for $p>1+\sqrt 2$ obtained by Lindblad et al.(Math. Ann. 2014), we then give a positive answer to the interesting question posed by Dafermos and Rodnianski(J. Math. Pures Appl. 2005): $p=1+\sqrt 2$ is exactly the critical power of $p$ separating stability and blow-up. This is a joint work with Prof. Yi Zhou.