C - map, very special quaternionic geometry and dual Kahler spaces

We show that for all very special quaternionic manifolds a different N=1 reduction exists, defining a Kaehler Geometry which is ``dual'' to the original very special Kaehler geometry with metric G_{a\bar{b}}= - \partial_a \partial_b \ln V (V={1/6}d_{abc}\lambda^a \lambda^b \lambda^c). The...

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Detalles Bibliográficos
Autores principales: D'Auria, R., Ferrara, Sergio, Trigiante, M.
Lenguaje:eng
Publicado: 2004
Materias:
Particle Physics - Theory
Acceso en línea:https://dx.doi.org/10.1016/j.physletb.2004.03.009
http://cds.cern.ch/record/707362
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author D'Auria, R.
Ferrara, Sergio
Trigiante, M.
author_facet D'Auria, R.
Ferrara, Sergio
Trigiante, M.
author_sort D'Auria, R.
collection CERN
description We show that for all very special quaternionic manifolds a different N=1 reduction exists, defining a Kaehler Geometry which is ``dual'' to the original very special Kaehler geometry with metric G_{a\bar{b}}= - \partial_a \partial_b \ln V (V={1/6}d_{abc}\lambda^a \lambda^b \lambda^c). The dual metric g^{ab}=V^{-2} (G^{-1})^{ab} is Kaehler and it also defines a flat potential as the original metric. Such geometries and some of their extensions find applications in Type IIB compactifications on Calabi--Yau orientifolds.
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institution Organización Europea para la Investigación Nuclear
language eng
publishDate 2004
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spelling cern-7073622023-03-14T17:06:42Zdoi:10.1016/j.physletb.2004.03.009http://cds.cern.ch/record/707362engD'Auria, R.Ferrara, SergioTrigiante, M.C - map, very special quaternionic geometry and dual Kahler spacesParticle Physics - TheoryWe show that for all very special quaternionic manifolds a different N=1 reduction exists, defining a Kaehler Geometry which is ``dual'' to the original very special Kaehler geometry with metric G_{a\bar{b}}= - \partial_a \partial_b \ln V (V={1/6}d_{abc}\lambda^a \lambda^b \lambda^c). The dual metric g^{ab}=V^{-2} (G^{-1})^{ab} is Kaehler and it also defines a flat potential as the original metric. Such geometries and some of their extensions find applications in Type IIB compactifications on Calabi--Yau orientifolds.We show that for all very special quaternionic manifolds a different N=1 reduction exists, defining a Kaehler Geometry which is ``dual'' to the original very special Kaehler geometry with metric G_{a\bar{b}}= - \partial_a \partial_b \ln V (V={1/6}d_{abc}\lambda^a \lambda^b \lambda^c). The dual metric g^{ab}=V^{-2} (G^{-1})^{ab} is Kaehler and it also defines a flat potential as the original metric. Such geometries and some of their extensions find applications in Type IIB compactifications on Calabi--Yau orientifolds.We show that for all very special quaternionic manifolds a different N =1 reduction exists, defining a Kähler geometry which is “dual” to the original very special Kähler geometry with metric G a b ̄ =−∂ a ∂ b ln V ( V =(1/6) d abc λ a λ b λ c ). The dual metric g ab = V −2 ( G −1 ) ab is Kähler and it also defines a flat potential as the original metric. Such geometries and some of their extensions find applications in type IIB compactifications on Calabi–Yau orientifolds.hep-th/0401161CERN-PH-2004-010CERN-PH-TH-2004-010oai:cds.cern.ch:7073622004-01-22
spellingShingle Particle Physics - Theory
D'Auria, R.
Ferrara, Sergio
Trigiante, M.
C - map, very special quaternionic geometry and dual Kahler spaces
title C - map, very special quaternionic geometry and dual Kahler spaces
title_full C - map, very special quaternionic geometry and dual Kahler spaces
title_fullStr C - map, very special quaternionic geometry and dual Kahler spaces
title_full_unstemmed C - map, very special quaternionic geometry and dual Kahler spaces
title_short C - map, very special quaternionic geometry and dual Kahler spaces
title_sort c - map, very special quaternionic geometry and dual kahler spaces
topic Particle Physics - Theory
url https://dx.doi.org/10.1016/j.physletb.2004.03.009
http://cds.cern.ch/record/707362
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AT ferrarasergio cmapveryspecialquaternionicgeometryanddualkahlerspaces
AT trigiantem cmapveryspecialquaternionicgeometryanddualkahlerspaces

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