1305.5964 (Hristu Culetu)
Hristu Culetu
A modified version of the Schwarzschild geometry is proposed. The source of curvature comes from an anisotropic fluid with $p_{r} = -\rho$ and fluctuating tangential pressures. The event horizon has zero surface gravity but the invariant acceleration of a static observer is finite there. The Tolman - Komar energy of the gravitational fluid changes sign on the horizon, equals the black hole mass at infinity and is vanishing at $r = 0$. The metric has no signature flip when the horizon is crossed and all the physical parameters are finite everywhere.
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http://arxiv.org/abs/1305.5964
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