Palatini–Lovelock–Cartan gravity—Bianchi identities for stringy fluxes

R. Blumenhagen, A. Deser, E. Plauschinn, F. Rennecke

Research output: Contribution to journalArticleAcademicpeer-review

Abstract

A Palatini-type action for Einstein and Gauss–Bonnet gravity with non-trivial torsion is proposed. A three-form flux is incorporated via a deformation of the Riemann tensor, and consistency of the Palatini variational principle requires the flux to be covariantly constant and to satisfy a Jacobi identity. Studying gravity actions of third order in the curvature leads to a conjecture about general Palatini–Lovelock–Cartan gravity. We point out potential relations to string-theoretic Bianchi identities and, using the Schouten–Nijenhuis bracket, derive a set of Bianchi identities for the non-geometric Q- and R-fluxes which include derivative and curvature terms. Finally, the problem of relating torsional gravity to higher order corrections of the bosonic string-effective action is revisited
Original languageEnglish
Article number135004
Pages (from-to)1-17
Number of pages17
JournalClassical and Quantum Gravity
Volume29
Issue number13
DOIs
Publication statusPublished - 2012

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