Global existence for nonlinear wave equations with multiple speeds

Abstract

We shall be concerned with the Cauchy problem for quasilinear systems in three space dimensions of the form i.1 ∂2tuI-c2I uI = CIJKabc∂c uJ∂a∂b uK + BIJKab∂a uJ∂b uK, I=1,..., D. Here we are using the convention of summing repeated indices, and ∂ u denotes the space-time gradient, ∂ u=(∂0 u, ∂1 u, ∂2 u, ∂3u), with ∂0=∂t, and ∂j=∂xj, j=1,2,3. We shall be in the nonrelativistic case where we assume that the wave speeds ck are all positive but not necessarily equal. Using a new pointwise estimate of the M. Keel, H. Smith and the author we shall prove global existence of small amplitude solutions for such equations satisfying a null condition. This generalizes the earlier result of Christodoulou and Klainerman where all the wave speeds are the same. Our approach is related to that of Klainerman; however, since we are in the non-relativistic case we cannot use the Lorentz boost vector fields or the Morawetz vector fields. Instead we exploit both the 1/t decay of linear solutions as well as the much easier to prove 1/|x| decay.

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