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A derivation of AdS/CFT for vector models

Ofer Aharony, Shai M. Chester, Erez Y. Urbach

2021Journal of High Energy Physics55 citationsDOIOpen Access PDF

Abstract

A bstract We explicitly rewrite the path integral for the free or critical O ( N ) (or U( N )) bosonic vector models in d space-time dimensions as a path integral over fields (including massless high-spin fields) living on ( d + 1)-dimensional anti-de Sitter space. Inspired by de Mello Koch, Jevicki, Suzuki and Yoon and earlier work, we first rewrite the vector models in terms of bi-local fields, then expand these fields in eigenmodes of the conformal group, and finally map these eigenmodes to those of fields on anti-de Sitter space. Our results provide an explicit (non-local) action for a high-spin theory on anti-de Sitter space, which is presumably equivalent in the large N limit to Vasiliev’s classical high-spin gravity theory (with some specific gauge-fixing to a fixed background), but which can be used also for loop computations. Our mapping is explicit within the 1 /N expansion, but in principle can be extended also to finite N theories, where extra constraints on products of bulk fields need to be taken into account.

Topics & Concepts

PhysicsPath integral formulationDe Sitter universeMassless particleConformal mapLimit (mathematics)Vector fieldAnti-de Sitter spaceAction (physics)Conformal field theoryMathematical physicsPath (computing)Effective actionTheoretical physicsField (mathematics)Minimal modelsClassical mechanicsField theory (psychology)Free fieldCurrent (fluid)Killing vector fieldDomain (mathematical analysis)Quantum field theoryClass (philosophy)De Sitter spaceOne-dimensional spaceMinimal modelBlack Holes and Theoretical PhysicsInternational Science and DiplomacyNoncommutative and Quantum Gravity Theories
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