Toric K3-fibred Calabi-Yau manifolds with del Pezzo divisors for string compactifications

• Verfasst von: Cicoli, Michele [VerfasserIn]
• Verfasst von: Kreuzer, Maximilian [VerfasserIn]
• Verfasst von: Mayrhofer, Christoph [VerfasserIn]
• Titel: Toric K3-fibred Calabi-Yau manifolds with del Pezzo divisors for string compactifications
• Verf.angabe: Michele Cicoli, Maximilian Kreuzer and Christoph Mayrhofer
• Fussnoten: Gesehen am 25.07.2018
• Titel Quelle: Enthalten in: Journal of high energy physics
• Jahr Quelle: 2012
• Band/Heft Quelle: (2012,02) Artikel-Nummer 002, 41 Seiten
• ISSN Quelle: 1029-8479
• DOI: doi:10.1007/JHEP02(2012)002
• Datenträger: Online-Ressource
• Sprache: eng
• K10plus-PPN: 1577922484

Abstract

We analyse several explicit toric examples of compact K3-fibred Calabi-Yau three-folds. These manifolds can be used for the study of string dualities and are crucial ingredients for the construction of LARGE Volume type IIB vacua with promising applications to cosmology and particle phenomenology. In order to build a phenomenologically viable model, on top of the two moduli corresponding to the base and the K3 fibre, we demand also the existence of two additional rigid divisors: the first supporting the non-perturbative effects needed to achieve moduli stabilisation, and the second allowing the presence of chiral matter on wrapped D-branes. We clarify the topology of these rigid divisors by discussing the interplay between a diagonal structure of the Calabi-Yau volume and D-terms. Del Pezzo divisors appearing in the volume form in a completely diagonal way are natural candidates for supporting non-perturbative effects and for quiver constructions, while ‘non-diagonal’ delPezzo and rigid but not del Pezzo divisors are particularly interesting for model building in the geometric regime. Searching through the existing list of four dimensional reflexive lattice polytopes, we find 158 examples admitting a Calabi-Yau hypersurface with a K3 fibration and four Kähler moduli where at least one of the toric divisors is a ‘diagonal’ del Pezzo. We work out explicitly the topological details of a few examples showing how, in the case of simplicial polytopes, all the del Pezzo divisors are ‘diagonal’, while ‘non-diagonal’ ones appear only in the case of non-simplicial polytopes. A companion paper will use these results in the study of moduli stabilisation for globally consistent explicit Calabi-Yau compactifications with the local presence of chirality.