TL;DR
This paper models quantum black hole evaporation unitarily within an infinite-dimensional Hilbert space using advanced algebraic techniques, extending previous finite-dimensional approaches and exploring holographic and ER bridge concepts.
Contribution
It introduces a novel infinite-dimensional model of black hole evaporation using Murray-von Neumann coupling and dual modular automorphisms, generalizing finite-dimensional frameworks.
Findings
Constructs a unitary model of black hole evaporation in infinite dimensions.
Links the evaporation process to dual modular automorphisms.
Provides algebraic insights into holography and ER bridges.
Abstract
We construct a model that describes the quantum black hole evaporation unitarily in a Hilbert space of infinite dimension. This construction generalizes Page's finite dimensional approach to infinite dimensions. The basic ingredient is the Murray-von Neumann coupling for finite type II factors. This coupling measures, at each time of the evaporation, the relative continuous dimension of the radiation and the black hole subspaces. The unitary transformation, implementing the quantum evaporation and thus determining the time dependence of the coupling, is identified with the dual modular automorphism. In the appendix we sketch, using von Neumann construction of infinite tensor products of EPR pairs of q-bits, some q-bit holographic correspondences as well as an algebraic definition of ER bridges.
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Taxonomy
TopicsBlack Holes and Theoretical Physics · Cosmology and Gravitation Theories · Relativity and Gravitational Theory