Extension principles for the Einstein Yang--Mills system

Abstract

We prove the local existence theorem and establish an extension principle for the spherically symmetric Einstein Yang--Mills system (SSEYM) with H1 data. This in addition implies Cauchy stability for the system. In contrast to a massless scalar field, the purely magnetic Yang--Mills field in spherical symmetry satisfies a wave-type equation with a singular potential. As a consequence, the proof of Christodoulou [10], based on an L∞-L∞ estimate, fails in the Yang--Mills context. Instead, we employ an L2-based method, which is valid for both massless and massive scalar matter fields as well.

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