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Dynamics for holographic codes

Tobias J. Osborne, Deniz E. Stiegemann

2020Journal of High Energy Physics16 citationsDOIOpen Access PDF

Abstract

A bstract We describe how to introduce dynamics for the holographic states and codes introduced by Pastawski, Yoshida, Harlow and Preskill. This task requires the definition of a continuous limit of the kinematical Hilbert space which we argue may be achieved via the semicontinuous limit of Jones. Dynamics is then introduced by building a unitary representation of a group known as Thompson’s group T , which is closely related to the conformal group conf (ℝ 1 , 1 ). The bulk Hilbert space is realised as a special subspace of the semicontinuous limit Hilbert space spanned by a class of distinguished states which can be assigned a discrete bulk geometry. The analogue of the group of large bulk diffeomorphisms is given by a unitary representation of the Ptolemy group Pt , on the bulk Hilbert space thus realising a toy model of the AdS/CFT correspondence which we call the Pt /T correspondence.

Topics & Concepts

Hilbert spacePhysicsGroup (periodic table)Subspace topologyUnitary representationLimit (mathematics)Projective Hilbert spaceUnitary stateGroup representationRepresentation (politics)Space (punctuation)Projective representationPOVMConformal groupUnitary groupClass (philosophy)Rigged Hilbert spaceTheoretical physicsConformal mapHolographyDynamics (music)Pure mathematicsHilbert manifoldQuantum mechanicsSIC-POVMQuantum stateGroup theoryPhase spaceQuantumFock spaceClassical limitHolographic principleSpectrum (functional analysis)Conformal field theorySpacetimeBlack Holes and Theoretical PhysicsAdvanced Combinatorial MathematicsHomotopy and Cohomology in Algebraic Topology
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