Tropical compactification
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In algebraic geometry, a tropical compactification is a compactification (projective completion) of a subvariety of an algebraic torus, introduced by Jenia Tevelev.[1][2] Given an algebraic torus and a connected closed subvariety of that torus, a compatification of the subvariety is defined as a closure of it in a toric variety of the original torus. The concept of a tropical compatification arises when trying to make compactifications as "nice" as possible. For a torus [math]\displaystyle{ T }[/math], a toric variety [math]\displaystyle{ \mathbb{P} }[/math], the compatification [math]\displaystyle{ \bar{X} }[/math] is tropical when the map
- [math]\displaystyle{ \Phi: T \times \bar{X} \to \mathbb{P},\ (t,x) \to tx }[/math]
is faithfully flat and [math]\displaystyle{ \bar{X} }[/math] is proper.
See also
- Tropical geometry
- GIT quotient
- Chow quotient
- Toroidal embedding
References
- ↑ Tevelev, Jenia (2007-08-07). "Compactifications of subvarieties of tori" (in en). American Journal of Mathematics 129 (4): 1087–1104. doi:10.1353/ajm.2007.0029. ISSN 1080-6377. https://muse.jhu.edu/article/218981/summary.
- ↑ Brugallé, Erwan; Shaw, Kristin (2014). "A Bit of Tropical Geometry". The American Mathematical Monthly 121 (7): 563–589. doi:10.4169/amer.math.monthly.121.07.563.
- Cavalieri, Renzo; Markwig, Hannah; Ranganathan, Dhruv (2017). "Tropical compactification and the Gromov–Witten theory of [math]\displaystyle{ \mathbb{P}^1 }[/math]". Selecta Mathematica 23: 1027–1060. Bibcode: 2014arXiv1410.2837C.
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