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Multi-entropy at low Renyi index in 2d CFTs

Jonathan Harper, Tadashi Takayanagi, Takashi Tsuda

2024SciPost Physics14 citationsDOIOpen Access PDF

Abstract

For a static time slice of AdS _3 <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" display="inline"> <mml:msub> <mml:mi/> <mml:mn>3</mml:mn> </mml:msub> </mml:math> we describe a particular class of minimal surfaces which form trivalent networks of geodesics. Through geometric arguments we provide evidence that these surfaces describe a measure of multipartite entanglement. By relating these surfaces to Ryu-Takayanagi surfaces it can be shown that this multipartite contribution is related to the angles of intersection of the bulk geodesics. A proposed boundary dual [Phys. Rev. D 106, 126001 (2022), J. High Energy Phys. 08, 202 (2023), J. High Energy Phys. 05, 008 (2023)], the multi-entropy, generalizes replica trick calculations involving twist operators by considering monodromies with finite group symmetry beyond the cyclic group used for the computation of entanglement entropy. We make progress by providing explicit calculations of Renyi multi-entropy in two dimensional CFTs and geometric descriptions of the replica surfaces for several cases with low genus. We also explore aspects of the free fermion and free scalar CFTs. For the free fermion CFT we examine subtleties in the definition of the twist operators used for the calculation of Renyi multi-entropy. In particular the standard bosonization procedure used for the calculation of the usual entanglement entropy fails and a different treatment is required.

Topics & Concepts

Rényi entropyIndex (typography)Statistical physicsMathematicsEntropy (arrow of time)Computer scienceStatisticsPhysicsPrinciple of maximum entropyQuantum mechanicsWorld Wide WebBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesQuantum many-body systems
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