In space dimension larger or equal to two, the non-linear Klein-Gordon equation with small, smooth, decaying initial data has global in time solutions. This no longer holds true in one space dimension, where examples of blowing up solutions are known. On the other hand, it has been proved that if the non-linearity satisfies a convenient compatibility condition, the ‘null condition’, one recovers global existence and that the solutions satisfy the same dispersive bounds as linear solutions. The goal of this talk is to show that, in the case of cubic semi-linear nonlinearities, this null condition is optimal, in the sense that, when it does not hold, one may construct small, smooth, decaying initial data giving rise to solutions that display inflation of their L∞ and L2 norms in finite time.
This video was produced by the SITE Research Center at New York University, as part of their talk series.
