Variational methods in AdS/CFT correspondence

Tomás Andrade, Máximo Bañados, and Francisco Rojas

Phys. Rev. D 75, 065013 – Published 16 March 2007

Abstract

We prove that the AdS/CFT calculation of 1-point functions can be drastically simplified by using variational arguments. We give a simple proof, valid for any theory that can be derived from a Lagrangian, that the large radius divergencies in 1-point functions can always be renormalized away (at least in the semiclassical approximation). The renormalized 1-point functions then follow by a simple variational problem involving only finite quantities. Several examples, a massive scalar, gravity, and renormalization flows, are discussed. Our results are general and can thus be used for dualities beyond AdS/CFT.

Received 29 December 2006

DOI:https://doi.org/10.1103/PhysRevD.75.065013

Authors & Affiliations

Tomás Andrade^*, Máximo Bañados^†, and Francisco Rojas^‡

Departamento de Física, P. Universidad Católica de Chile, Casilla 306, Santiago 22, Chile.

^*Electronic address: tiandrad@uc.cl
^†Electronic address: maxbanados@fis.puc.cl
^‡Electronic address: frojasf@uc.cl

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Issue

Vol. 75, Iss. 6 — 15 March 2007

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Physical Review D

covering particles, fields, gravitation, and cosmology