Global existence for systems of quasilinear wave equations in (1+4)-dimensions

Abstract

H\"ormander proved global existence of solutions for sufficiently small initial data for scalar wave equations in (1+4)-dimensions of the form u = Q(u, u', u'') where Q vanishes to second order and (∂u2 Q)(0,0,0)=0. Without the latter condition, only almost global existence may be guaranteed. The first author and Sogge considered the analog exterior to a star-shaped obstacle. Both results relied on writing the lowest order terms u∂α u = 12∂α u2 and as such do not immediately generalize to systems. The current study remedies such and extends both results to the case of multiple speed systems.