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Preprints, Working Papers, ... Year : 2023

Logarithmic degenerations of Landau-Ginzburg models for toric orbifolds and global tt^* geometry

Abstract

We discuss the behavior of Landau-Ginzburg models for toric orbifolds near the large volume limit. This enables us to express mirror symmetry as an isomorphism of Frobenius manifolds which aquire logarithmic poles along a boundary divisor. If the toric orbifold admits a crepant resolution we construct a global moduli space on the B-side and show that the associated tt^*-geometry exists globally.

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Algebraic Geometry [math.AG]
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https://hal.science/hal-01653150

Submitted on : Wednesday, October 11, 2023-4:09:24 PM

Last modification on : Saturday, April 27, 2024-3:10:14 AM

Long-term archiving on: Friday, January 12, 2024-7:26:09 PM

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hal-01653150 , version 1 (11-10-2023)

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Etienne Mann, Thomas Reichelt. Logarithmic degenerations of Landau-Ginzburg models for toric orbifolds and global tt^* geometry. 2023. ⟨hal-01653150⟩

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CNRS UNIV-ANGERS LAREMA FMPL I3M_UMR5149 INSMI CHL IMAG-MONTPELLIER UNIV-MONTPELLIER ANR
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