Energy estimates for the Einstein-Yang-Mills fields and applications
Abstract
We prove exterior energy estimates for tensorial non-linear wave equations, where the background metric is a perturbation of the Minkowski space-time, and where the derivatives are the Minkowski covariant derivatives. We obtain bounds in the exterior region of the Minkowski space-time, for the weighted L2 norm on each component, separately, of the covariant derivative of the tensorial solutions, and we also control a space-time integral in the exterior of the covariant tangential derivatives of the solutions. As a special application, we use here these energy estimates to prove the exterior stability of the Minkowski space-time, R1+4, as solution to the coupled Einstein-Yang-Mills system associated to any compact Lie group G, in the Lorenz gauge and in wave coordinates. The bounds in the exterior for the L2 norm on the covariant derivatives of each component, separately, of the tensor solution, as well as the bound on the space-time integral of the covariant tangential derivatives, are motivated by a problem that we will address in a paper that follows to prove the exterior stability of the (1+3)-Minkowski space-time for perturbations governed by the Einstein-Yang-Mills equations.
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