Gamma conjecture and tropical geometry
Abstract
Hodge-theoretic mirror symmetry for a Calabi-Yau mirror pair says that the variation of Hodge structure arising from quantum cohomology of a Calabi-Yau manifold and that arising from deformation of complex structures on the dual Calabi-Yau manifold can be identified with each other, and it has been conjectured (Gamma-conjecture) that the Gamma-integral structure in quantum cohomology corresponds to a natural integral structure on the mirror side. Here the Gamma-integral structure is defined via the topological K-group and the Gamma-class, a characteristic class with transcendental coefficients containing the Riemann -values. In this article, we explain an approach to the Gamma-conjecture using tropical geometry and observe that the Riemann -values arise as error terms of tropicalization in the computation of mirror periods. This is based on joint work [AGIS] with Abouzaid, Ganatra and Sheridan.
Cite
@article{arxiv.2307.15946,
title = {Gamma conjecture and tropical geometry},
author = {Hiroshi Iritani},
journal= {arXiv preprint arXiv:2307.15946},
year = {2023}
}
Comments
15 pages, 8 figures, This is an expository article on joint work with Abouzaid, Ganatra and Sheridan. Proceedings of the 66th Algebra (Daisugaku) Symposium, from 31 August to 3 September 2021, organized by Algebra Section, Mathematical Society of Japan, published on 31 December 2021 at https://www.mathsoc.jp/section/algebra/algsymp_past/algsymp21_files/procalgsymp2021.pdf