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arxiv: 2404.03456 · v2 · pith:U4KPQINR · submitted 2024-04-04 · hep-th · math.AG

Charting the Complex Structure Landscape of F-theory

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classification hep-th math.AG
keywords complexstructurecalabi--yauf-theoryfourfoldsinfinitylandscapemonodromy
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We explore the landscape of F-theory compactifications on Calabi--Yau fourfolds whose complex structure moduli space is the thrice-punctured sphere. As a first part, we enumerate all such Calabi--Yau fourfolds under the additional requirement that it has a large complex structure and conifold point at two of the punctures. We find 14 monodromy tuples by demanding the monodromy around infinity to be quasi-unipotent. As second part, we study the four different types of phases arising at infinity. For each we consider a working example where we determine the leading periods and other physical couplings. We also included a notebook that sets up the period vectors for any of these models.

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Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Quantum obstructions for $N=1$ infinite distance limits -- Part I: $g_s$ obstructions

    hep-th 2026-03 unverdicted novelty 6.0

    Non-perturbative g_s corrections obstruct perturbative Type IIB descriptions and can remove classical infinite distance degenerations in asymptotic regions of the complex structure moduli space.