For any affine variety equipped with coordinates, there is a surjective, continuous map from its Berkovich space to its tropicalisation. Exploiting torus actions, we develop techniques for finding an explicit, continuous section of this map. In particular, we prove that such a section exists for linear spaces, Grassmannians of planes (reproving a result due to Cueto, Häbich, and Werner), matrix varieties defined by the vanishing of 3 × 3-minors, and for the hypersurface defined by Cayley’s hyperdeterminant.
Faithful tropicalisation and torus actions / Draisma, J.; Postinghel, E.. - In: MANUSCRIPTA MATHEMATICA. - ISSN 0025-2611. - 149:3-4(2016), pp. 315-338. [10.1007/s00229-015-0781-3]
Faithful tropicalisation and torus actions
Postinghel E.
2016-01-01
Abstract
For any affine variety equipped with coordinates, there is a surjective, continuous map from its Berkovich space to its tropicalisation. Exploiting torus actions, we develop techniques for finding an explicit, continuous section of this map. In particular, we prove that such a section exists for linear spaces, Grassmannians of planes (reproving a result due to Cueto, Häbich, and Werner), matrix varieties defined by the vanishing of 3 × 3-minors, and for the hypersurface defined by Cayley’s hyperdeterminant.| File | Dimensione | Formato | |
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