Rigid D6-branes on $ {{{{T^6}}} \left/ {{\left( {{Z_2} \times {Z_{2M}} \times \Omega \mathcal{R}} \right)}} \right.} $ with discrete torsion

Förste, Stefan; Honecker, Gabriele

doi:10.1007/jhep01(2011)091

Cited by 29 publications

(12 citation statements)

References 89 publications

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“…Simplest models include toroidal orbifold compactifications, see e.g., [75][76][77][78][79][80][81]. In this section we consider a type IIA orientifold of the…”

Section: An Explicit Examplementioning

confidence: 99%

RR photons

Cámara

Ibáñez

Marchesano

2011

J. High Energ. Phys.

163

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Type II string compactifications to 4d generically contain massless RamondRamond U(1) gauge symmetries. However there is no massless matter charged under these U(1)'s, which makes a priori difficult to measure any physical consequences of their existence. There is however a window of opportunity if these RR U(1)'s mix with the hypercharge U(1) Y (hence with the photon). In this paper we study in detail different avenues by which U(1) RR bosons may mix with D-brane U(1)'s. We concentrate on Type IIA orientifolds and their M-theory lift, and provide geometric criteria for the existence of such mixing, which may occur either via standard kinetic mixing or via the mass terms induced by Stückelberg couplings. The latter case is particularly interesting, and appears whenever D-branes wrap torsional p-cycles in the compactification manifold. We also show that in the presence of torsional cycles discrete gauge symmetries and Aharanov-Bohm strings and particles appear in the 4d effective action, and that type IIA Stückelberg couplings can be understood in terms of torsional (co)homology in M-theory. We provide examples of Type IIA Calabi-Yau orientifolds in which the required torsional cycles exist and kinetic mixing induced by mass mixing is present. We discuss some phenomenological consequences of our findings. In particular, we find that mass mixing may induce corrections relevant for hypercharge gauge coupling unification in F-theory SU(5) GUT's.

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“…Simplest models include toroidal orbifold compactifications, see e.g., [75][76][77][78][79][80][81]. In this section we consider a type IIA orientifold of the…”

Section: An Explicit Examplementioning

confidence: 99%

RR photons

Cámara

Ibáñez

Marchesano

2011

J. High Energ. Phys.

163

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“…3 However recently, general structure of these geometries was declared in an exact and analytical way in a "dual" description with operator formalism [51]. In that paper, the authors treated most general cases on magnetized T 2 /Z 2,3,4,6 with nonzero (discretized) Wilson line phases and/or Scherk-Schwarz phases, which were discussed in [52] (see also [53,54,43,[55][56][57][58][59][60][61]). Note that shifted orbifold can be considered on a magnetized torus [62].…”

Section: Introductionmentioning

confidence: 99%

Classification of three-generation models on magnetized orbifolds

et al. 2015

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We classify the combinations of parameters which lead three generations of quarks and leptons in the framework of magnetized twisted orbifolds on $T^2/Z_2$, $T^2/Z_3$, $T^2/Z_4$ and $T^2/Z_6$ with allowing nonzero discretized Wilson line phases and Scherk-Schwarz phases. We also analyze two actual examples with nonzero phases leading to one-pair Higgs and five-pair Higgses and discuss the difference from the results without nonzero phases studied previously.Comment: 28 pages (main body and references) + 65 pages (full list of classification), 22 tables (v1); typos corrected, problem in sentence fixed (v2

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“…In practice, the three types of stringy consistency conditions are straightforwardly computed for factorisable torus backgrounds, T 6 = (T 2 ) 3 , and orbifolds thereof, (T 2 ) 3 /Γ (with Γ = Z N or Z N × Z M with(out) discrete torsion), on which a full classification of three-cycles with typical Betti number b 3 ∼ O(10 − 50) is possible and for which Conformal Field Theory (CFT) methods can be invoked [42][43][44][45] to not only cross-check the RR tadpole cancellation conditions in terms of vacuum amplitudes, but most importantly to determine the set of probe D-branes with U Sp(2) gauge groups for the K-theory constraints. 16,28,[46][47][48] Generalizing these results to so-called non-factorizable tori, e.g. T 6 = (T 3 ) 2 or T 3 × T 1 × T 2 , or orbifolds thereof is possible whenever the sLag cycles can be rewritten in terms of a factorized geometry, as was recently noticed [49][50][51] when extending the first CFT computations 52,53 to intersecting generic D6-branes with chiral spectra on non-factorizable T 6 /(Z 4 ×ΩR) backgrounds.…”

Section: Consistency Conditionsmentioning

confidence: 99%

“…The a priori six different choices of orientations of the (T 2 ) 3 lattice under the antiholomorphic involution R can be reduced to two, 16 i.e. T 2 (1) is either of rectangular or of tilted shape, and due to the discrete torsion phase one O6-plane orbit ΩR(Z (i) 2 ) has to be of exotic type, 46,73 with two inequivalent choices, ΩR or ΩRZ (3) 2 , consistent with SUSY D6-branes on the so-called aAA-lattice orientation.…”

Section: Example: Mssm Onmentioning

confidence: 99%

“…The computations and resulting non-renormalization are, however, only valid for bulk D6-branes, due to the prefactors trγ Z2 = 0 of the annulus amplitudes used there. All string vacua with chiral matter on fractional 2, 6, 7, 49, 60, [97][98][99][100][101][102][103] or rigid 13,16,18,46,70,73,104,109 D6-branes violate this condition, making the extension of these computations to non-trivial twisted annulus contributions necessary. The second generalization of the above CFT methods consists in considering nonperturbative effects from D2-brane instantons wrapped along compact three-cycles.…”

Section: Cft and Beyond Leading Ordermentioning

confidence: 99%

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From Type II string theory toward BSM/dark sector physics

Honecker

2016

Int. J. Mod. Phys. A

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Four-dimensional compactifications of string theory provide a controlled set of possible gauge representations accounting for BSM particles and dark sector components. In this review, constraints from perturbative Type II string compactifications in the geometric regime are discussed in detail and then compared to results from heterotic string compactifications and non-perturbative/non-geometric corners. As a prominent example, an open string realization of the QCD axion is presented. The status of deriving the associated low-energy effective action in four dimensions is discussed and open avenues of major phenomenological importance are highlighted. As examples, a mechanism of closed string moduli stabilization by D-brane backreaction as well as one-loop threshold corrections to the gauge couplings and balancing a low string scale M string with unisotropic compact dimensions are discussed together with implications on potential future new physics observations. For illustrative purposes, an explicit example of a globally consistent D6-brane model with MSSM-like spectrum on T 6 /(Z 2 × Z 6 × ΩR) is presented.

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Rigid D6-branes on $ {{{{T^6}}} \left/ {{\left( {{Z_2} \times {Z_{2M}} \times \Omega \mathcal{R}} \right)}} \right.} $ with discrete torsion

Cited by 29 publications

References 89 publications

RR photons

RR photons

Classification of three-generation models on magnetized orbifolds

From Type II string theory toward BSM/dark sector physics

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