Asymptotically Anti-de Sitter Spherically Symmetric Hairy Black Holes

Abstract

We construct one-parameter families of static spherically symmetric asymptotically anti-de Sitter black hole solutions (M,gε,ϕε) to the Einstein-Maxwell-(charged) Klein-Gordon equations. Each family bifurcates off a sub-extremal Reissner-Nordström-AdS spacetime (M,g0,ϕ00). For a co-dimensional one set of black hole parameters, we show that Dirichlet (respectively Neumann) boundary conditions can be imposed for the scalar field. The construction provides a counter-example to a version of the no-hair conjecture in the context of a negative cosmological constant. Our result is based on our companion work [W. Zheng, Exponentially-growing Mode Instability on the Reissner-Nordström-Anti-de-Sitter black holes], in which the existence of linear hair and growing mode solutions have been established. In the charged scalar field case, our result provides the first rigorous mathematical construction of the so-called holographic superconductors, which are of particular significance in high-energy physics.

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