Yves Brihaye scite author profile

We consider the superposition of the first two members of the gravitational hierarchy (Einstein plus first Gauss-Bonnet(GB)) interacting with the superposition of the first two members of the SO (±) (d) Yang-Mills hierarchy, in d dimensions. Such systems can occur in the low energy effective action of string theory. Particle-like solutions in dimensions d = 6, 8 are constructed respectively. Our results reveal qualitatively new properties featuring double-valued solutions with critical behaviour. In this preliminary study, we have restricted ourselves to one-node solutions.

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The electroweak sphaleron at physical mixing angle

Kleihaus¹,

Kunz²,

Brihaye³

1991

Physics Letters B

120

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Myers–Perry black holes with scalar hair and a mass gap

Brihaye¹,

Herdeiro²,

Radu³

2014

Physics Letters B

108

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Editor: M. CvetičWe construct a family of asymptotically flat, rotating black holes with scalar hair and a regular horizon, within five dimensional Einstein's gravity minimally coupled to a complex, massive scalar field doublet. These solutions are supported by rotation and have no static limit. They are described by their mass M, two equal angular momenta J 1 = J 2 ≡ J and a conserved Noether charge Q , measuring the scalar hair.For vanishing horizon size the solutions reduce to five dimensional boson stars. In the limit of vanishing Noether charge density, the scalar field becomes point-wise arbitrarily small and the geometry becomes, locally, arbitrarily close to that of a specific set of Myers-Perry black holes (MPBHs); but there remains a global difference with respect to the latter, manifest in a finite mass gap. Thus, the scalar hair never becomes a linear perturbation of MPBHs. This is a qualitative difference when compared to Kerr black holes with scalar hair [1]. Whereas the existence of the latter can be anticipated in linear theory, from the existence of scalar bound states on the Kerr geometry (i.e. scalar clouds), the hair of these MPBHs is intrinsically non-linear.

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Sphalerons at finite mixing angle

1992

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Yves Brihaye

Higher order curvature generalizations of Bartnick–McKinnon and coloured black hole solutions in d=5

Particle-like solutions to higher-order curvature Einstein–Yang–Mills systems in d dimensions

The electroweak sphaleron at physical mixing angle

Myers–Perry black holes with scalar hair and a mass gap

Sphalerons at finite mixing angle

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