Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture /
to model theory -- to stability theory and Morley rank -- Omega-stable groups -- Model theory of algebraically closed fields -- to abelian varieties and the Mordell-Lang conjecture -- The model-theoretic content of Lang’s conjecture -- Zariski geometries -- Differentially closed fields -- Separably closed fields -- Proof of the Mordell-Lang conjecture for function fields -- Proof of Manin’s theorem by reduction to positive characteristic.
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Format: | Texto biblioteca |
Language: | eng |
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Berlin, Heidelberg : Springer Berlin Heidelberg,
1998
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Subjects: | Mathematics., Algebraic geometry., Mathematical logic., Number theory., Algebraic Geometry., Mathematical Logic and Foundations., Number Theory., |
Online Access: | http://dx.doi.org/10.1007/978-3-540-68521-0 |
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KOHA-OAI-TEST:2072652018-07-30T23:37:35ZModel Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / Bouscaren, Elisabeth. editor. SpringerLink (Online service) textBerlin, Heidelberg : Springer Berlin Heidelberg,1998.engto model theory -- to stability theory and Morley rank -- Omega-stable groups -- Model theory of algebraically closed fields -- to abelian varieties and the Mordell-Lang conjecture -- The model-theoretic content of Lang’s conjecture -- Zariski geometries -- Differentially closed fields -- Separably closed fields -- Proof of the Mordell-Lang conjecture for function fields -- Proof of Manin’s theorem by reduction to positive characteristic.Mathematics.Algebraic geometry.Mathematical logic.Number theory.Mathematics.Algebraic Geometry.Mathematical Logic and Foundations.Number Theory.Springer eBookshttp://dx.doi.org/10.1007/978-3-540-68521-0URN:ISBN:9783540685210 |
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Mathematics. Algebraic geometry. Mathematical logic. Number theory. Mathematics. Algebraic Geometry. Mathematical Logic and Foundations. Number Theory. Mathematics. Algebraic geometry. Mathematical logic. Number theory. Mathematics. Algebraic Geometry. Mathematical Logic and Foundations. Number Theory. |
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Mathematics. Algebraic geometry. Mathematical logic. Number theory. Mathematics. Algebraic Geometry. Mathematical Logic and Foundations. Number Theory. Mathematics. Algebraic geometry. Mathematical logic. Number theory. Mathematics. Algebraic Geometry. Mathematical Logic and Foundations. Number Theory. Bouscaren, Elisabeth. editor. SpringerLink (Online service) Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / |
description |
to model theory -- to stability theory and Morley rank -- Omega-stable groups -- Model theory of algebraically closed fields -- to abelian varieties and the Mordell-Lang conjecture -- The model-theoretic content of Lang’s conjecture -- Zariski geometries -- Differentially closed fields -- Separably closed fields -- Proof of the Mordell-Lang conjecture for function fields -- Proof of Manin’s theorem by reduction to positive characteristic. |
format |
Texto |
topic_facet |
Mathematics. Algebraic geometry. Mathematical logic. Number theory. Mathematics. Algebraic Geometry. Mathematical Logic and Foundations. Number Theory. |
author |
Bouscaren, Elisabeth. editor. SpringerLink (Online service) |
author_facet |
Bouscaren, Elisabeth. editor. SpringerLink (Online service) |
author_sort |
Bouscaren, Elisabeth. editor. |
title |
Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / |
title_short |
Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / |
title_full |
Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / |
title_fullStr |
Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / |
title_full_unstemmed |
Model Theory and Algebraic Geometry [electronic resource] : An introduction to E. Hrushovski’s proof of the geometric Mordell-Lang conjecture / |
title_sort |
model theory and algebraic geometry [electronic resource] : an introduction to e. hrushovski’s proof of the geometric mordell-lang conjecture / |
publisher |
Berlin, Heidelberg : Springer Berlin Heidelberg, |
publishDate |
1998 |
url |
http://dx.doi.org/10.1007/978-3-540-68521-0 |
work_keys_str_mv |
AT bouscarenelisabetheditor modeltheoryandalgebraicgeometryelectronicresourceanintroductiontoehrushovskisproofofthegeometricmordelllangconjecture AT springerlinkonlineservice modeltheoryandalgebraicgeometryelectronicresourceanintroductiontoehrushovskisproofofthegeometricmordelllangconjecture |
_version_ |
1756268361557213184 |