Author:
Abramovich Dan,Chen Qile,Gross Mark,Siebert Bernd
Abstract
We prove a decomposition formula of logarithmic Gromov–Witten invariants in a degeneration setting. A one-parameter log smooth family $X \longrightarrow B$ with singular fibre over $b_0\in B$ yields a family $\mathscr {M}(X/B,\beta ) \longrightarrow B$ of moduli stacks of stable logarithmic maps. We give a virtual decomposition of the fibre of this family over $b_0$ in terms of rigid tropical maps to the tropicalization of $X/B$. This generalizes one aspect of known results in the case that the fibre $X_{b_0}$ is a normal crossings union of two divisors. We exhibit our formulas in explicit examples.
Subject
Algebra and Number Theory
Reference46 articles.
1. SP17 The Stacks Project Authors, Stacks Project, http://stacks.math.columbia.edu (2017).
2. Par19b Parker, B. , Holomorphic curves in exploded manifolds: Kuranishi structure, Preprint (2019), arXiv:1301.4748.
3. Stable logarithmic maps to Deligne-Faltings pairs II
4. Toric degenerations of toric varieties and tropical curves
5. Stacks of stable maps and Gromov-Witten invariants
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