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Point-counting and the Zilber-Pink conjecture

紀錄類型:	書目-語言資料,印刷品 : Monograph/item
正題名/作者:	Point-counting and the Zilber-Pink conjecture/ Jonathan Pila.
作者:	Pila, Jonathan.
出版者:	Cambridge :Cambridge University Press, : 2022.,
面頁冊數:	x, 254 p. :ill., digital ; : 23 cm.;
附註:	Title from publisher's bibliographic system (viewed on 07 Apr 2022).
標題:	Arithmetical algebraic geometry. -
電子資源:	https://doi.org/10.1017/9781009170314
ISBN:	9781009170314

Point-counting and the Zilber-Pink conjecture
Pila, Jonathan.

Point-counting and the Zilber-Pink conjecture[electronic resource] /Jonathan Pila. - Cambridge :Cambridge University Press,2022. - x, 254 p. :ill., digital ;23 cm. - Cambridge tracts in mathematics ;228. - Cambridge tracts in mathematics ;203..

Title from publisher's bibliographic system (viewed on 07 Apr 2022).

Point-counting -- Multiplicative Manin-Mumford -- Powers of the modular curve as Shimura varieties -- Modular André-Oort -- Point-counting and the André-Oort conjecture -- Model theory and definable sets -- O-minimal structures -- Parameterization and point-counting -- Better bounds -- Point-counting and Galois orbit bounds -- Complex analysis in O-minimal structures -- Schanuel's conjecture and Ax-Schanuel -- A formal setting -- Modular Ax-Schanuel -- Ax-Schanuel for Shimura varieties -- Quasi-periods of elliptic curves -- Sources -- Formulations -- Some results -- Curves in a power of the modular curve -- Conditional modular Zilber-Pink -- O-minimal uniformity -- Uniform Zilber-Pink.

Point-counting results for sets in real Euclidean space have found remarkable applications to diophantine geometry, enabling significant progress on the André-Oort and Zilber-Pink conjectures. The results combine ideas close to transcendence theory with the strong tameness properties of sets that are definable in an o-minimal structure, and thus the material treated connects ideas in model theory, transcendence theory, and arithmetic. This book describes the counting results and their applications along with their model-theoretic and transcendence connections. Core results are presented in detail to demonstrate the flexibility of the method, while wider developments are described in order to illustrate the breadth of the diophantine conjectures and to highlight key arithmetical ingredients. The underlying ideas are elementary and most of the book can be read with only a basic familiarity with number theory and complex algebraic geometry. It serves as an introduction for postgraduate students and researchers to the main ideas, results, problems, and themes of current research.

ISBN: 9781009170314Subjects--Topical Terms:

680690
Arithmetical algebraic geometry.

LC Class. No.: QA242.5 / .P553 2022

Dewey Class. No.: 516.35

Point-counting and the Zilber-Pink conjecture
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500 $a Title from publisher's bibliographic system (viewed on 07 Apr 2022).
505 0 $a Point-counting -- Multiplicative Manin-Mumford -- Powers of the modular curve as Shimura varieties -- Modular André-Oort -- Point-counting and the André-Oort conjecture -- Model theory and definable sets -- O-minimal structures -- Parameterization and point-counting -- Better bounds -- Point-counting and Galois orbit bounds -- Complex analysis in O-minimal structures -- Schanuel's conjecture and Ax-Schanuel -- A formal setting -- Modular Ax-Schanuel -- Ax-Schanuel for Shimura varieties -- Quasi-periods of elliptic curves -- Sources -- Formulations -- Some results -- Curves in a power of the modular curve -- Conditional modular Zilber-Pink -- O-minimal uniformity -- Uniform Zilber-Pink.
520 $a Point-counting results for sets in real Euclidean space have found remarkable applications to diophantine geometry, enabling significant progress on the André-Oort and Zilber-Pink conjectures. The results combine ideas close to transcendence theory with the strong tameness properties of sets that are definable in an o-minimal structure, and thus the material treated connects ideas in model theory, transcendence theory, and arithmetic. This book describes the counting results and their applications along with their model-theoretic and transcendence connections. Core results are presented in detail to demonstrate the flexibility of the method, while wider developments are described in order to illustrate the breadth of the diophantine conjectures and to highlight key arithmetical ingredients. The underlying ideas are elementary and most of the book can be read with only a basic familiarity with number theory and complex algebraic geometry. It serves as an introduction for postgraduate students and researchers to the main ideas, results, problems, and themes of current research.
650 0 $a Arithmetical algebraic geometry. $3 680690
650 0 $a Diophantine equations. $3 792270
650 0 $a Modular curves. $3 890182
650 0 $a Model theory. $3 633609
830 0 $a Cambridge tracts in mathematics ; $v 203. $3 1238301
856 4 0 $u https://doi.org/10.1017/9781009170314