Black Holes or Firewalls: A Theory of Horizons

TL;DR

This paper develops a quantum theory of black hole horizons that preserves complementarity, avoids firewalls, and explains the structure of horizon degrees of freedom, ensuring smooth horizons and consistent infalling observer experiences.

Contribution

It introduces a microscopic model of black hole horizons that maintains smoothness and complementarity without contradicting information theory, and extends to de Sitter horizons.

Findings

Black hole degrees of freedom scale as e^{A/2 l_P^2}

Smooth horizons occupy a subspace of dimension e^{A/4 l_P^2}

Infalling observers find smooth horizons with probability 1

Abstract

We present a quantum theory of black hole (and other) horizons, in which the standard assumptions of complementarity are preserved without contradicting information theoretic considerations. After the scrambling time, the quantum mechanical structure of a black hole becomes that of an eternal black hole at the microscopic level. In particular, the stretched horizon degrees of freedom and the states entangled with them can be mapped into the near-horizon modes in the two exterior regions of an eternal black hole, whose mass is taken to be that of the evolving black hole at each moment. Salient features arising from this picture include: (i) the number of degrees of freedom needed to describe a black hole is e^{A/2 l_P^2}, where A is the area of the horizon; (ii) black hole states having smooth horizons span only an e^{A/4 l_P^2}-dimensional subspace of the relevant e^{A/2 l_P^2}-dimensional Hilbert space; (iii) internal dynamics of the horizon is such that an infalling observer finds a smooth horizon with probability 1 if a state stays in this subspace. We identify the structure of local operators in the exterior and interior spacetime regions, and show that this structure avoids firewall arguments---the horizon can keep being smooth throughout the evolution. We discuss the fate of falling observers under various circumstances, especially when they manipulate degrees of freedom before entering the horizon, and find that an observer can never see a firewall by making a measurement on early Hawking radiation. We also consider the framework in an infalling reference frame, and argue that Minkowski-like vacua are not unique. In particular, the number of true Minkowski vacua is infinite, although the label discriminating these vacua cannot be accessed in usual non-gravitational quantum field theory. An application to de Sitter horizons is also discussed.