Stable black hole solutions with non-Abelian fields
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We construct finite mass, asymptotically flat black hole solutions in d=4 Einstein-Yang-Mills theory augmented with higher order curvature terms of the gauge field. They possess non-Abelian hair in addition to Coulomb electric charge, and, below some non-zero critical temperature, they are thermodynamically preferred over the Reissner-Nordstrom solution. Our results indicate the existence of hairy non-Abelian black holes which are stable under linear, spherically symmetric perturbations.
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Forward citations
Cited by 2 Pith papers
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Stable colored black holes with quartic self-interactions
Analytic proof that branch I of non-Abelian black holes with quartic interactions is linearly stable while branch II is unstable, based on the sign of the effective potential in even and odd perturbation sectors.
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Stable colored black holes with quartic self-interactions
Branch I of non-Abelian black holes with quartic self-interactions is linearly stable for all regular parameter values of the coupling χ.
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