Faithful realizability of tropical curves
M.-W. Cheung, L. Fantini, J. Park, M. Ulirsch, ArXiv:1410.4152 (2014).
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Journal Article
| English
Author
Cheung, Man-Wai;
Fantini, Lorenzo;
Park, Jennifer;
Ulirsch, Martin
Abstract
We study whether a given tropical curve $Γ$ in $\mathbb{R}^n$ can be realized as the tropicalization of an algebraic curve whose non-archimedean skeleton is faithfully represented by $Γ$. We give an affirmative answer to this question for a large class of tropical curves that includes all trivalent tropical curves, but also many tropical curves of higher valence. We then deduce that for every metric graph $G$ with rational edge lengths there exists a smooth algebraic curve in a toric variety whose analytification has skeleton $G$, and the corresponding tropicalization is faithful. Our approach is based on a combination of the theory of toric schemes over discrete valuation rings and logarithmically smooth deformation theory, expanding on a framework introduced by Nishinou and Siebert.
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Journal Title
arXiv:1410.4152
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Cite this
Cheung M-W, Fantini L, Park J, Ulirsch M. Faithful realizability of tropical curves. arXiv:14104152. Published online 2014.
Cheung, M.-W., Fantini, L., Park, J., & Ulirsch, M. (2014). Faithful realizability of tropical curves. ArXiv:1410.4152.
@article{Cheung_Fantini_Park_Ulirsch_2014, title={Faithful realizability of tropical curves}, journal={arXiv:1410.4152}, author={Cheung, Man-Wai and Fantini, Lorenzo and Park, Jennifer and Ulirsch, Martin}, year={2014} }
Cheung, Man-Wai, Lorenzo Fantini, Jennifer Park, and Martin Ulirsch. “Faithful Realizability of Tropical Curves.” ArXiv:1410.4152, 2014.
M.-W. Cheung, L. Fantini, J. Park, and M. Ulirsch, “Faithful realizability of tropical curves,” arXiv:1410.4152, 2014.
Cheung, Man-Wai, et al. “Faithful Realizability of Tropical Curves.” ArXiv:1410.4152, 2014.