Equivariant mirror symmetry for footballs

Abstract

In this paper, we establish equivariant mirror symmetry for footballs F(m,r). This extends the results by B. Fang, C.C. Liu and Z. Zong, where the projective line was considered [ Geometry \& Topology 24:2049-2092, 2017], and the results by D. Tang of weighted projective lines, on [arXiv:1712.04836]. More precisely, we prove the equivalence of the R-matrices for A-model and B-model at large radius limit, and establish isomorphism for R-matrices for general radius. We further demonstrate that the graph sum of higher genus cases are the same for both models, hence establish equivariant mirror symmetry for footballs. In last two sections the large radius limit and equivariant limit are considered, resulting a generealized Bouchard-Mari\~no conjecture and Norbury-Scott conjecture respectively.

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