On the Global Well-Posedness of the Einstein-Yang-Mills System

Abstract

In this paper, we present a partial result on the global well-posedness of the Cauchy problem for the Einstein-Yang-Mills system in the constant mean extrinsic curvature spatial harmonic and generalized Coulomb gauges as introduced in [Mondal, arXiv:2112.14273]. We give a small-data global existence theorem for a family of n+1 dimensional spacetimes with n≥4, utilizing energy arguments presented in [Andersson and Moncrief, arXiv:0908.0784]. We observe that these energy arguments will fail for n=3 due to the conformal invariance of the 3+1 Yang-Mills equations and present a gauge-covaraiant formulation of the Einstein-Yang-Mills system in 3+1 dimensions to show that an energy argument cannot be used to prove the global well-posedness result, regardless of the choice of gauge.

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