Abstract
We explore the distribution of topological numbers in Calabi–Yau manifolds, using the Kreuzer–Skarke dataset of hypersurfaces in toric varieties as a testing ground. While the Hodge numbers are well-known to exhibit mirror symmetry, patterns in frequencies of combination thereof exhibit striking new patterns. We find pseudo-Voigt and Planckian distributions with high confidence and exact fit for many substructures. The patterns indicate typicality within the landscape of Calabi–Yau manifolds of various dimension.
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CITATION STYLE
He, Y. H., Jejjala, V., & Pontiggia, L. (2017). Patterns in Calabi–Yau Distributions. Communications in Mathematical Physics, 354(2), 477–524. https://doi.org/10.1007/s00220-017-2907-9
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