An introduction to algebraic geometry and algebraic groups / Meinolf Geck.

Format:

Book

Author/Creator:

Geck, Meinolf, author.

Series:

Oxford graduate texts in mathematics ; 10.

Oxford science publications.

Oxford scholarship online.

Oxford graduate texts in mathematics ; 10

Oxford science publications

Oxford scholarship online

Language:

English

Subjects (All):

Geometry, Algebraic.

Linear algebraic groups.

Physical Description:

1 online resource (320 p.)

Place of Publication:

Oxford : Oxford University Press, 2023.

Language Note:

English

Summary:

An accessible text introducing algebraic geometry and algebraic groups at advanced undergraduate and early graduate level, this book develops the language of algebraic geometry from scratch and uses it to set up the theory of affine algebraic geometries from basic principles.

Contents:

Cover; Contents; 1 Algebraic sets and algebraic groups; 1.1 The Zariski topology on affine space; 1.2 Groebner bases and the Hilbert polynomial; 1.3 Regular maps, direct products, and algebraic groups; 1.4 The tangent space and non-singular points; 1.5 The Lie algebra of a linear algebraic group; 1.6 Groups with a split BN-pair; 1.7 BN-pairs in symplectic and orthogonal groups; 1.8 Bibliographic remarks and exercises; 2 Affine varieties and finite morphisms; 2.1 Hilbert's nullstellensatz and abstract affine varieties; 2.2 Finite morphisms and Chevalley's theorem

2.3 Birational equivalences and normal varieties2.4 Linearization and generation of algebraic groups; 2.5 Group actions on affine varieties; 2.6 The unipotent variety of the special linear groups; 2.7 Bibliographic remarks and exercises; 3 Algebraic representations and Borel subgroups; 3.1 Algebraic representations, solvable groups, and tori; 3.2 The main theorem of elimination theory; 3.3 Grassmannian varieties and flag varieties; 3.4 Parabolic subgroups and Borel subgroups; 3.5 On the structure of Borel subgroups; 3.6 Bibliographic remarks and exercises

4 Frobenius maps and finite groups of Lie type4.1 Frobenius maps and rational structures; 4.2 Frobenius maps and BN-pairs; 4.3 Further applications of the Lang-Steinberg theorem; 4.4 Counting points on varieties over finite fields; 4.5 The virtual characters of Deligne and Lusztig; 4.6 An example: the characters of the Suzuki groups; 4.7 Bibliographic remarks and exercises; Index; A; B; C; D; E; F; G; H; I; J; K; L; M; N; O; P; R; S; T; U; V; W; Z

Notes:

Formerly CIP.

Previously issued in print: 2003.

Includes bibliographical references (pages [298]-303) and index.

Derived record based on print version record and publisher information.

ISBN:

1-383-02466-9

1-299-13293-6

0-19-166372-7

OCLC:

830162676