Double Metric, Generalized Metric and $\alpha'$-Geometry

Olaf Hohm; Barton Zwiebach

arXiv:1509.02930·hep-th·March 23, 2016

Double Metric, Generalized Metric and $\alpha'$-Geometry

Olaf Hohm, Barton Zwiebach

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TL;DR

This paper connects the double metric in $\

Contribution

It demonstrates how to derive the generalized metric from the double metric, revealing higher-derivative corrections and clarifying the Green-Schwarz deformation in $\

Findings

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First-order $\

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paper_type

03

theoretical

Abstract

We relate the unconstrained `double metric' of the ` $α^{'}$ -geometry' formulation of double field theory to the constrained generalized metric encoding the spacetime metric and b-field. This is achieved by integrating out auxiliary field components of the double metric in an iterative procedure that induces an infinite number of higher-derivative corrections. As an application we prove that, to first order in $α^{'}$ and to all orders in fields, the deformed gauge transformations are Green-Schwarz-deformed diffeomorphisms. We also prove that to first order in $α^{'}$ the spacetime action encodes precisely the Green-Schwarz deformation with Chern-Simons forms based on the torsionless gravitational connection. This seems to be in tension with suggestions in the literature that T-duality requires a torsionful connection, but we explain that these assertions are ambiguous since…

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