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Main Authors: Becker, Katrin, Brady, Nathan, Graña, Mariana, Morros, Miguel, Sengupta, Anindya, You, Qi
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.16758
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author Becker, Katrin
Brady, Nathan
Graña, Mariana
Morros, Miguel
Sengupta, Anindya
You, Qi
author_facet Becker, Katrin
Brady, Nathan
Graña, Mariana
Morros, Miguel
Sengupta, Anindya
You, Qi
contents Calabi-Yau compactifications have typically a large number of complex structure and/or Kähler moduli that have to be stabilised in phenomenologically-relevant vacua. The former can in principle be done by fluxes in type IIB solutions. However, the tadpole conjecture proposes that the number of stabilised moduli can at most grow linearly with the tadpole charge of the fluxes required for stabilisation. We scrutinise this conjecture in the $2^6$ Gepner model: a non-geometric background mirror dual to a rigid Calabi-Yau manifold, in the deep interior of moduli space. By constructing an extensive set of supersymmetric Minkowski flux solutions, we spectacularly confirm the linear growth, while achieving a slightly higher ratio of stabilised moduli to flux charge than the conjectured upper bound. As a byproduct, we obtain for the first time a set of solutions within the tadpole bound where all complex structure moduli are massive. Since the $2^6$ model has no Kähler moduli, these show that the massless Minkowski conjecture does not hold beyond supergravity.
format Preprint
id arxiv_https___arxiv_org_abs_2407_16758
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Tadpole conjecture in non-geometric backgrounds
Becker, Katrin
Brady, Nathan
Graña, Mariana
Morros, Miguel
Sengupta, Anindya
You, Qi
High Energy Physics - Theory
Calabi-Yau compactifications have typically a large number of complex structure and/or Kähler moduli that have to be stabilised in phenomenologically-relevant vacua. The former can in principle be done by fluxes in type IIB solutions. However, the tadpole conjecture proposes that the number of stabilised moduli can at most grow linearly with the tadpole charge of the fluxes required for stabilisation. We scrutinise this conjecture in the $2^6$ Gepner model: a non-geometric background mirror dual to a rigid Calabi-Yau manifold, in the deep interior of moduli space. By constructing an extensive set of supersymmetric Minkowski flux solutions, we spectacularly confirm the linear growth, while achieving a slightly higher ratio of stabilised moduli to flux charge than the conjectured upper bound. As a byproduct, we obtain for the first time a set of solutions within the tadpole bound where all complex structure moduli are massive. Since the $2^6$ model has no Kähler moduli, these show that the massless Minkowski conjecture does not hold beyond supergravity.
title Tadpole conjecture in non-geometric backgrounds
topic High Energy Physics - Theory
url https://arxiv.org/abs/2407.16758