The Local-Orbifold Correspondence for Simple Normal Crossing Pairs

Battistella, Luca; Nabijou, Navid; Tseng, Hsian-Hua; You, Fenglong

doi:10.1017/s1474748022000172

Cited by 3 publications

(2 citation statements)

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“…In the case of an irreducible smooth nef divisor, the correspondence between genus 0 log and local GW invariants was proven in all dimensions at the cycle-level in [36], with various extensions in [8-10, 14, 15, 23-25, 34, 55, 61, 62]. The naive conjectural extension of this log-local correspondence at the cycle level for normal crossings divisors has been recently disproved [8,55]. However, the numerical version of the log-local correspondence for normal crossing divisors seems to hold in a number of cases of great interest: for example this was proved for point insertions of orbifold toric pairs in [14], and for point invariants of log Calabi-Yau surfaces with nef D i in [15].…”

Section: Numerical Log-local Our First Results Is the Followingmentioning

confidence: 99%

“…2 As discussed in more details in [15, §1.4], point insertions and the log Calabi-Yau condition are both crucial assumptions allowing us to obtain the numerical log-local correspondence despite the general negative results of [8,55]. In [15, §5], we gave a conceptual proof by degeneration of the numerical log-local correspondence for log Calabi-Yau surfaces with two boundary components.…”

Section: 16)mentioning

confidence: 99%

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Stable maps to Looijenga pairs: orbifold examples

2021

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In [15] we established a series of correspondences relating five enumerative theories of log Calabi-Yau surfaces, i.e. pairs (Y, D) with Y a smooth projective complex surface and D = D1 + • • • + D l an anticanonical divisor on Y with each Di smooth and nef. In this paper we explore the generalisation to Y being a smooth Deligne-Mumford stack with projective coarse moduli space of dimension 2, and Di nef Q-Cartier divisors. We consider in particular three infinite families of orbifold log Calabi-Yau surfaces, and for each of them we provide closed form solutions of the maximal contact log Gromov-Witten theory of the pair (Y, D), the local Gromov-Witten theory of the total space of i OY (−Di), and the open Gromov-Witten of toric orbi-branes in a Calabi-Yau 3-orbifold associated to (Y, D). We also consider new examples of BPS integral structures underlying these invariants, and relate them to the Donaldson-Thomas theory of a symmetric quiver specified by (Y, D), and to a class of open/closed BPS invariants.

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Section: Numerical Log-local Our First Results Is the Followingmentioning

confidence: 99%

Section: 16)mentioning

confidence: 99%

Stable maps to Looijenga pairs: orbifold examples

2021

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Gromov–Witten theory with maximal contacts

Nabijou

Ranganathan

2022

Forum of Mathematics, Sigma

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We propose an intersection-theoretic method to reduce questions in genus 0 logarithmic Gromov–Witten theory to questions in the Gromov–Witten theory of smooth pairs, in the presence of positivity. The method is applied to the enumerative geometry of rational curves with maximal contact orders along a simple normal crossings divisor and to recent questions about its relationship to local curve counting. Three results are established. We produce counterexamples to the local-logarithmic conjectures of van Garrel–Graber–Ruddat and Tseng–You. We prove that a weak form of the conjecture holds for product geometries. Finally, we explicitly determine the difference between local and logarithmic theories, in terms of relative invariants for which efficient algorithms are known. The polyhedral geometry of the tropical moduli of maps plays an essential and intricate role in the analysis.

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