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9780521691413

Introduction to Algebraic Geometry

by
  • ISBN13:

    9780521691413

  • ISBN10:

    0521691419

  • Edition: 1st
  • Format: Paperback
  • Copyright: 2007-05-21
  • Publisher: Cambridge University Press

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Summary

Algebraic geometry has a reputation for being difficult and inaccessible, even among mathematicians! This must be overcome. The subject is central to pure mathematics, and applications in fields like physics, computer science, statistics, engineering, and computational biology are increasingly important. This book is based on courses given at Rice University and the Chinese University of Hong Kong, introducing algebraic geometry to a diverse audience consisting of advanced undergraduate and beginning graduate students in mathematics, as well as researchers in related fields. For readers with a grasp of linear algebra and elementary abstract algebra, the book covers the fundamental ideas and techniques of the subject and places these in a wider mathematical context. However, a full understanding of algebraic geometry requires a good knowledge of guiding classical examples, and this book offers numerous exercises fleshing out the theory. It introduces Grobner bases early on and offers algorithms for most every technique described. Both students of mathematics and researchers in related areas benefit from the emphasis on computational methods and concrete examples. Book jacket.

Table of Contents

Prefacep. xi
Guiding problemsp. 1
Implicitizationp. 1
Ideal membershipp. 4
Interpolationp. 5
Exercisesp. 8
Division algorithm and Grobner basesp. 11
Monomial ordersp. 11
Grobner bases and the division algorithmp. 13
Normal formsp. 16
Existence and chain conditionsp. 19
Buchberger's Criterionp. 22
Syzygiesp. 26
Exercisesp. 29
Affine varietiesp. 33
Ideals and varietiesp. 33
Closed sets and the Zariski topologyp. 38
Coordinate rings and morphismsp. 39
Rational mapsp. 43
Resolving rational mapsp. 46
Rational and unirational varietiesp. 50
Exercisesp. 53
Eliminationp. 57
Projections and graphsp. 57
Images of rational mapsp. 61
Secant varieties, joins, and scrollsp. 65
Exercisesp. 68
Resultantsp. 73
Common roots of univariate polynomialsp. 73
The resultant as a function of the rootsp. 80
Resultants and elimination theoryp. 82
Remarks on higher-dimensional resultantsp. 84
Exercisesp. 87
Irreducible varietiesp. 89
Existence of the decompositionp. 90
Irreducibility and domainsp. 91
Dominant morphismsp. 92
Algorithms for intersections of idealsp. 94
Domains and field extensionsp. 96
Exercisesp. 98
Nullstellensatzp. 101
Statement of the Nullstellensatzp. 102
Classification of maximal idealsp. 103
Transcendence basesp. 104
Integral elementsp. 106
Proof of Nullstellensatz Ip. 108
Applicationsp. 109
Dimensionp. 111
Exercisesp. 112
Primary decompositionp. 116
Irreducible idealsp. 116
Quotient idealsp. 118
Primary idealsp. 119
Uniqueness of primary decompositionp. 122
An application to rational mapsp. 128
Exercisesp. 131
Projective geometryp. 134
Introduction to projective spacep. 134
Homogenization and dehomogenizationp. 137
Projective varietiesp. 140
Equations for projective varietiesp. 141
Projective Nullstellensatzp. 144
Morphisms of projective varietiesp. 145
Productsp. 154
Abstract varietiesp. 156
Exercisesp. 162
Projective elimination theoryp. 169
Homogeneous equations revisitedp. 170
Projective elimination idealsp. 171
Computing the projective elimination idealp. 174
Images of projective varieties are closedp. 175
Further elimination resultsp. 176
Exercisesp. 177
Parametrizing linear subspacesp. 181
Dual projective spacesp. 181
Tangent spaces and dual varietiesp. 182
Grassmannians: Abstract approachp. 187
Exterior algebrap. 191
Grassmannians as projective varietiesp. 197
Equations for the Grassmannianp. 199
Exercisesp. 202
Hilbert polynomials and the Bezout Theoremp. 207
Hilbert functions definedp. 207
Hilbert polynomials and algorithmsp. 211
Intersection multiplicitiesp. 215
Bezout Theoremp. 219
Interpolation problems revisitedp. 225
Classification of projective varietiesp. 229
Exercisesp. 231
Notions from abstract algebrap. 235
Rings and homomorphismsp. 235
Constructing new rings from oldp. 236
Modulesp. 238
Prime and maximal idealsp. 239
Factorization of polynomialsp. 240
Field extensionsp. 242
Exercisesp. 244
Bibliographyp. 246
Indexp. 249
Table of Contents provided by Ingram. All Rights Reserved.

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