Zeta functions of alternate mirror Calabi–Yau families

Zeta functions of alternate mirror Calabi–Yau families

We prove that if two Calabi–Yau invertible pencils have the same dual weights, then they share a common factor in their zeta functions. By using Dwork cohomology, we demonstrate that this common factor is related to a hypergeometric Picard–Fuchs differential equation. The factor in the zeta function...

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Veröffentlicht in:Israel journal of mathematics 2018-10, Vol.228 (2), p.665-705
Hauptverfasser: Doran, Charles F., Kelly, Tyler L., Salerno, Adriana, Sperber, Steven, Voight, John, Whitcher, Ursula
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Analysis
Applications of Mathematics
Differential equations
Group Theory and Generalizations
Mathematical and Computational Physics
Mathematics
Mathematics and Statistics
Theoretical
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Zusammenfassung:We prove that if two Calabi–Yau invertible pencils have the same dual weights, then they share a common factor in their zeta functions. By using Dwork cohomology, we demonstrate that this common factor is related to a hypergeometric Picard–Fuchs differential equation. The factor in the zeta function is defined over the rationals and has degree at least the order of the Picard–Fuchs equation. As an application, we relate several pencils of K3 surfaces to the Dwork pencil, obtaining new cases of arithmetic mirror symmetry.
ISSN:0021-2172
1565-8511
DOI:10.1007/s11856-018-1783-0