Stability of some two dimensional wave maps: a wave--Klein-Gordon model

Abstract: We are interested in the stability of a class of totally geodesic wave maps, as recently studied by Abbrescia and Chen, and later by Duan and Ma. The relevant equations of motion are a system of coupled semilinear wave and Klein-Gordon equations in $\mathbb{R}^{1+n}$ whose nonlinearities are critical when $n=2$. In this paper we use a pure energy method to show global existence when $n=2$. By carefully examining the structure of the nonlinear terms, we are able to obtain uniform energy bounds at lower orders. This allows us to prove pointwise decay estimates and also to reduce the required regularity.