Entanglement, Holography and Causal Diamonds

TL;DR

This paper introduces a novel way to analyze entanglement in conformal field theories by studying observables on the moduli space of causal diamonds, revealing connections to holography, operator expansions, and nonlinear dynamics.

Contribution

It constructs new observables on the causal diamond moduli space that unify entanglement measures, holographic duals, and equations of motion, extending understanding of entanglement dynamics.

Findings

Observables relate to entanglement entropy and higher spin generalizations.

In holographic CFTs, observables are integrals over Ryu-Takayanagi surfaces.

Small perturbations obey linear equations; universal states follow nonlinear Liouville and Toda equations.

Abstract

We argue that the degrees of freedom in a d-dimensional CFT can be re-organized in an insightful way by studying observables on the moduli space of causal diamonds (or equivalently, the space of pairs of timelike separated points). This 2d-dimensional space naturally captures some of the fundamental nonlocality and causal structure inherent in the entanglement of CFT states. For any primary CFT operator, we construct an observable on this space, which is defined by smearing the associated one-point function over causal diamonds. Known examples of such quantities are the entanglement entropy of vacuum excitations and its higher spin generalizations. We show that in holographic CFTs, these observables are given by suitably defined integrals of dual bulk fields over the corresponding Ryu-Takayanagi minimal surfaces. Furthermore, we explain connections to the operator product expansion and the first law of entanglement entropy from this unifying point of view. We demonstrate that for small perturbations of the vacuum, our observables obey linear two-derivative equations of motion on the space of causal diamonds. In two dimensions, the latter is given by a product of two copies of a two-dimensional de Sitter space. For a class of universal states, we show that the entanglement entropy and its spin-three generalization obey nonlinear equations of motion with local interactions on this moduli space, which can be identified with Liouville and Toda equations, respectively. This suggests the possibility of extending the definition of our new observables beyond the linear level more generally and in such a way that they give rise to new dynamically interacting theories on the moduli space of causal diamonds. Various challenges one has to face in order to implement this idea are discussed.