Johanna Knapp scite author profile

Making use of toric geometry we construct a class of global F-theory GUT models. The base manifolds are blowups of Fano threefolds and the Calabi-Yau fourfold is a complete intersection of two hypersurfaces. We identify possible GUT divisors and construct SO(10) models on them using the spectral cover construction. We use a split spectral cover to generate chiral matter on the 10 curves in order to get more degrees of freedom in phenomenology. We use abelian flux to break SO(10) to SU(5)\times U(1) which is interpreted as a flipped SU(5) model. With the GUT Higgses in the SU(5)\times U(1) model it is possible to further break the gauge symmetry to the Standard Model. We present several phenomenologically attractive examples in detail.Comment: 58 pages, modified models, added references, corrected typo

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Toric construction of global F-theory GUTs

Knapp

Kreuzer²,

Mayrhofer

et al. 2011

J. High Energ. Phys.

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We systematically construct a large number of compact Calabi-Yau fourfolds which are suitable for F-theory model building. These elliptically fibered Calabi-Yaus are complete intersections of two hypersurfaces in a six dimensional ambient space. We first construct three-dimensional base manifolds that are hypersurfaces in a toric ambient space. We search for divisors which can support an F-theory GUT. The fourfolds are obtained as elliptic fibrations over these base manifolds. We find that elementary conditions which are motivated by F-theory GUTs lead to strong constraints on the geometry, which significantly reduce the number of suitable models. The complete database of models is available at [1]. We work out several examples in more detail.

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Linear sigma models with strongly coupled phases — one parameter models

Hori

Knapp

2013

J. High Energ. Phys.

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We systematically construct a class of two-dimensional (2, 2) supersymmetric gauged linear sigma models with phases in which a continuous subgroup of the gauge group is totally unbroken. We study some of their properties by employing a recently developed technique. The focus of the present work is on models with one Kähler parameter. The models include those corresponding to Calabi-Yau threefolds, extending three examples found earlier by a few more, as well as Calabi-Yau manifolds of other dimensions and non-Calabi-Yau manifolds. The construction leads to predictions of equivalences of D-brane categories, systematically extending earlier examples. There is another type of surprise. Two distinct superconformal field theories corresponding to Calabi-Yau threefolds with different Hodge numbers, h 2,1 = 23 versus h 2,1 = 59, have exactly the same quantum Kähler moduli space. The strong-weak duality plays a crucial rôle in confirming this, and also is useful in the actual computation of the metric on the moduli space.

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Johanna Knapp

Global SO(10) F-theory GUTs

Toric construction of global F-theory GUTs

Linear sigma models with strongly coupled phases — one parameter models

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