Abstract
The first law for entanglement entropy in CFT in an odd-dimensional asymptotically AdS black hole is studied by using the AdS/CFT duality. The entropy of CFT considered here is due to the entanglement between two subsystems separated by the horizon of the AdS black hole, which itself is realized as the conformal boundary of a black droplet in even-dimensional global AdS bulk spacetime. In $(2+1)$-dimensional CFT, the first law is shown to be always satisfied by analyzing a class of metric perturbations of the exact solution of a $4$-dimensional black droplet. In $(4+1)$-dimensions, the first law for CFT is shown to hold under the Neumann boundary condition at a certain bulk hypersurface anchored to the conformal boundary of the boundary AdS black hole. From the boundary view point, this Neumann condition yields there being no energy flux across the boundary of the boundary AdS black hole. Furthermore, the asymptotic geometry of a $6$-dimensional small AdS black droplet is constructed as the gravity dual of our $(4+1)$-dimensional CFT, which exhibits a negative energy near the spatial infinity, as expected from vacuum polarization.
Highlights
The entanglement entropy of a quantum field in black hole backgrounds has attracted much attention as the key concept toward understanding the origin of the BekensteinHawking entropy
We examine the first law of the entanglement entropy of odd-dimensional conformal field theories (CFT) in anti–de Sitter (AdS) black hole backgrounds by using the Noether charge formula in the holographic setting
We have derived the first law of the entanglement entropy for two subsystems separated by an AdS black hole for odd-dimensional conformal field theory (CFT) by using the holographic method and applying the Noether charge formula
Summary
The entanglement entropy of a quantum field in black hole backgrounds has attracted much attention as the key concept toward understanding the origin of the BekensteinHawking entropy (for review, see e.g., [1]). In the holographic proof of the first law [5], the Noether charge formula [7] plays an essential role This is because the entanglement entropy for any ball-shaped spatial region in flat AdS boundary corresponds, through a conformal transformation, to the horizon area of a zero-mass hyperbolic black hole in the bulk. We examine the first law of the entanglement entropy of odd-dimensional conformal field theories (CFT) in AdS black hole backgrounds by using the Noether charge formula in the holographic setting. In the Appendix, we briefly discuss the Noether charge formula (2.4) for general perturbations in (5 þ 1)-dimensional bulk metric (4.2)
Sign-in/Register to view highlights & summary Sign-in/Register to access full text options 
Free) 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
