Punctured logarithmic maps
Abstract
We introduce a variant of stable logarithmic maps, which we call punctured logarithmic maps. They allow an extension of logarithmic Gromov-Witten theory in which marked points have a negative order of tangency with boundary divisors. As a main application we develop a gluing formalism which reconstructs stable logarithmic maps and their virtual cycles without expansions of the target, with tropical geometry providing the underlying combinatorics. Punctured Gromov-Witten invariants also play a pivotal role in the intrinsic construction of mirror partners by the last two authors in arXiv:1909.07649, conjecturally relating to symplectic cohomology, and in the logarithmic gauged linear sigma model in upcoming work of the second author with Felix Janda and Yongbin Ruan.
Cite
@article{arxiv.2009.07720,
title = {Punctured logarithmic maps},
author = {Dan Abramovich and Qile Chen and Mark Gross and Bernd Siebert},
journal= {arXiv preprint arXiv:2009.07720},
year = {2024}
}
Comments
125 pages; v2: minor changes throughout the text, added more figures and an appendix on charts for morphisms of log stacks; v3: added appendix on functorial tropicalization, changed treatment of targets with monodromy, minor corrections and more details provided at many places