Sheaves of maximal intersection and multiplicities of stable log maps

Choi, Jinwon; Garrel, Michel van; Katz, Sheldon; Takahashi, Nobuhiro

doi:10.1007/s00029-021-00671-0

Cited by 7 publications

(1 citation statement)

References 44 publications

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“…, l with l ≥ 2. We classify these by recalling some results of di Rocco [38] (see also [33,Section 2] and [32,34]).…”

Section: Nef Looijenga Pairsmentioning

confidence: 99%

Stable maps to Looijenga pairs

Bousseau,

Brini,

van Garrel

2020

Preprint

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A log Calabi-Yau surface with maximal boundary, or Looijenga pair, is a pair (Y, D) with Y a smooth rational projective complex surface and D = D1 + • • • + D l ∈ | − KY | an anticanonical singular nodal curve. Under some positivity conditions on the pair, we propose a series of correspondences relating five different classes of enumerative invariants attached to (Y, D): (1) the log Gromov-Witten theory of the pair (Y, D), (2) the Gromov-Witten theory of the total space of i OY (−Di), (3) the open Gromov-Witten theory of special Lagrangians in a Calabi-Yau 3-fold determined by (Y, D), (4) the Donaldson-Thomas theory of a symmetric quiver specified by (Y, D), and (5) a class of BPS invariants considered in different contexts by Klemm-Pandharipande, Ionel-Parker, and Labastida-Mariño-Ooguri-Vafa. We furthermore provide a complete closed-form solution to the calculation of all these invariants.

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“…, l with l ≥ 2. We classify these by recalling some results of di Rocco [38] (see also [33,Section 2] and [32,34]).…”

Section: Nef Looijenga Pairsmentioning

confidence: 99%

Stable maps to Looijenga pairs

Bousseau,

Brini,

van Garrel

2020

Preprint

Self Cite

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Divisors and curves on logarithmic mapping spaces

Kennedy-Hunt,

Nabijou,

Shafi

et al. 2024

Sel. Math. New Ser.

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We determine the rational class and Picard groups of the moduli space of stable logarithmic maps in genus zero, with target projective space relative a hyperplane. For the class group we exhibit an explicit basis consisting of boundary divisors. For the Picard group we exhibit a spanning set indexed by piecewise-linear functions on the tropicalisation. In both cases a complete set of boundary relations is obtained by pulling back the WDVV relations from the space of stable curves. Our proofs hinge on a controlled technique for manufacturing test curves in logarithmic mapping spaces, opening up the topology of these spaces to further study.

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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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Sheaves of maximal intersection and multiplicities of stable log maps

Cited by 7 publications

References 44 publications

Stable maps to Looijenga pairs

Stable maps to Looijenga pairs

Divisors and curves on logarithmic mapping spaces

Stable maps to Looijenga pairs: orbifold examples

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