Closed-string mirror symmetry for dimer models
Symplectic Geometry
2025-11-11 v1 Representation Theory
Abstract
For all punctured Riemann surfaces arising as mirror curves of toric Calabi--Yau threefolds, we show that their symplectic cohomology is isomorphic to the compactly supported Hochschild cohomology of the noncommutative Landau--Ginzburg model defined on the NCCR of the associated toric Gorenstein singularities. This mirror correspondence is established by analyzing the closed-open map with boundaries on certain combinatorially defined immersed Lagrangians in the Riemann surface, yielding a ring isomorphism. We give a detailed examination of the properties of this isomorphism, emphasizing its relationship to the singularity structure.
Cite
@article{arxiv.2511.06699,
title = {Closed-string mirror symmetry for dimer models},
author = {Dahye Cho and Hansol Hong and Hyeongjun Jin and Sangwook Lee},
journal= {arXiv preprint arXiv:2511.06699},
year = {2025}
}
Comments
51 pages and 16 figures; comments are welcome!