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Tropical Algebraic Geometry
Tropical geometry is algebraic geometry over the semifield of tropical numbers, i.e., the real numbers and negative infinity enhanced with the (max,+)-arithmetics. Geometrically, tropical varieties are much simpler than their classical counterparts. Yet they carry information about complex and real...
| Auteurs principaux : | , , |
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| Collectivité auteur : | |
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| Format : | Livre |
| Langue : | anglais |
| Titre complet : | Tropical Algebraic Geometry / Ilia Itenberg, Grigory Mikhalkin, Eugenii Shustin |
| Édition : | 1st ed. 2007. |
| Publié : |
Basel :
Birkhäuser Basel
, [20..] Cham : Springer Nature |
| Collection : | Oberwolfach Seminars (Online) ; 35 |
| Accès en ligne : |
Accès Nantes Université
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| Note sur l'URL : | Accès sur la plateforme de l'éditeur Accès sur la plateforme Istex |
| Condition d'utilisation et de reproduction : | Conditions particulières de réutilisation pour les bénéficiaires des licences nationales : https://www.licencesnationales.fr/springer-nature-ebooks-contrat-licence-ln-2017 |
| Contenu : | Contient des exercices |
| Sujets : | |
| Documents associés : | Autre format:
Tropical algebraic geometry Autre format: Tropical Algebraic Geometry Autre format: Tropical algebraic geometry Autre format: Tropical Algebraic Geometry Autre format: Tropical algebraic geometry |
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| 200 | 1 | |a Tropical Algebraic Geometry |f Ilia Itenberg, Grigory Mikhalkin, Eugenii Shustin | |
| 205 | |a 1st ed. 2007. | ||
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| 330 | |a Tropical geometry is algebraic geometry over the semifield of tropical numbers, i.e., the real numbers and negative infinity enhanced with the (max,+)-arithmetics. Geometrically, tropical varieties are much simpler than their classical counterparts. Yet they carry information about complex and real varieties. These notes present an introduction to tropical geometry and contain some applications of this rapidly developing and attractive subject. It consists of three chapters which complete each other and give a possibility for non-specialists to make the first steps in the subject which is not yet well represented in the literature. The intended audience is graduate, post-graduate, and Ph.D. students as well as established researchers in mathematics | ||
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| 452 | | | |0 115228942 |t Tropical algebraic geometry |f Ilia Itenberg, Grigory Mikhalkin, Eugenii Shustin |c Basel |n Birkhäuser |d 2007 |p 1 vol. (VIII-103 p.) |s Oberwolfach Seminars |y 978-3-7643-8309-1 | |
| 452 | | | |t Tropical Algebraic Geometry |b Texte imprimé |y 9783764391966 | |
| 452 | | | |0 115228942 |t Tropical algebraic geometry |f Ilia Itenberg, Grigory Mikhalkin, Eugenii Shustin |c Basel |n Birkhäuser |d 2007 |p 1 vol. (VIII-103 p.) |s Oberwolfach Seminars |y 978-3-7643-8309-1 | |
| 452 | | | |t Tropical Algebraic Geometry |b Texte imprimé |y 9783764391966 | |
| 452 | | | |0 115228942 |t Tropical algebraic geometry |f Ilia Itenberg, Grigory Mikhalkin, Eugenii Shustin |c Basel |n Birkhäuser |d 2007 |p 1 vol. (VIII-103 p.) |s Oberwolfach Seminars |y 978-3-7643-8309-1 | |
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