Hair on near-extremal Reissner-Nordstrom AdS black holes

Abstract

We discuss hairy black hole solutions with scalar hair of scaling dimension and (small) electromagnetic coupling q2, near extremality. Using trial functions, we show that hair forms below a critical temperature Tc in the region of parameter space (, q2) above a critical line qc2 (). For > 0, the critical coupling qc2 is determined by the AdS2 geometry of the horizon. For < 0, qc2 is below the value suggested by the near horizon geometry at extremality. We provide an analytic estimate of 0 (numerically, 0 ≈ 0.64). We also compute analytically the true critical line for the entire range of the scaling dimension. In particular for q=0, we obtain an instability down to the unitarity bound. We perform explicit analytic calculations of Tc, the condensate and the conductivity. We show that the energy gap in units of Tc diverges as we approach the critical line (Tc 0).