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Algebraic approach to geometry : geometric trilogy III / Francis Borceux.

By: Material type: TextTextPublication details: Switzerland : Springer, 2014.Description: xvii, 430 p. : ill. ; 24 cmISBN:
  • 9783319017327 (hard cover : alk. paper)
Subject(s): DDC classification:
  • 23 B726 516.35
Contents:
1.The Birth of Analytic Geometry -- 2.Affine Geometry -- 3.More on Real Affine Spaces -- 4.Euclidean Geometry -- 5.Hermitian Spaces -- 6.Projective Geometry -- 7.Algebraic Curves -- Appendices: A. Polynomials Over a Field -- Appendices: B. Polynomials in Several Variables -- Appendices: C. Homogenous Polynomials -- Appendices: D. Resultants -- Appendices: E. Symmetric Polynomials -- Appendices: F. Complex Numbers -- Appendices: G. Quadratic Forms -- Appendices: H. Dual Spaces-- References and further reading-- Index--
Summary: This is a unified treatment of the various algebraic approaches to geometric spaces. The study of algebraic curves in the complex projective plane is the natural link between linear geometry at an undergraduate level and algebraic geometry at a graduate level, and it is also an important topic in geometric applications, such as cryptography. 380 years ago, the work of Fermat and Descartes led us to study geometric problems using coordinates and equations. Today, this is the most popular way of handling geometrical problems. Linear algebra provides an efficient tool for studying all the first degree (lines, planes) and second degree (ellipses, hyperboloids) geometric figures, in the affine, the Euclidean, the Hermitian and the projective contexts. But recent applications of mathematics, like cryptography, need these notions not only in real or complex cases, but also in more general settings, like in spaces constructed on finite fields. And of course, why not also turn our attention to geometric figures of higher degrees? Besides all the linear aspects of geometry in their most general setting, this book also describes useful algebraic tools for studying curves of arbitrary degree and investigates results as advanced as the Bezout theorem, the Cramer paradox, topological group of a cubic, rational curves etc. Hence the book is of interest for all those who have to teach or study linear geometry: affine, Euclidean, Hermitian, projective; it is also of great interest to those who do not want to restrict themselves to the undergraduate level of geometric figures of degree one or two.
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Holdings
Item type Current library Call number Status Date due Barcode Item holds
Books ISI Library, Kolkata 516.35 B726 (Browse shelf(Opens below)) Available 135332
Total holds: 0

Includes bibliographical references and index.

1.The Birth of Analytic Geometry --
2.Affine Geometry --
3.More on Real Affine Spaces --
4.Euclidean Geometry --
5.Hermitian Spaces --
6.Projective Geometry --
7.Algebraic Curves --
Appendices: A. Polynomials Over a Field --
Appendices: B. Polynomials in Several Variables --
Appendices: C. Homogenous Polynomials --
Appendices: D. Resultants --
Appendices: E. Symmetric Polynomials --
Appendices: F. Complex Numbers --
Appendices: G. Quadratic Forms --
Appendices: H. Dual Spaces--

References and further reading--
Index--

This is a unified treatment of the various algebraic approaches to geometric spaces. The study of algebraic curves in the complex projective plane is the natural link between linear geometry at an undergraduate level and algebraic geometry at a graduate level, and it is also an important topic in geometric applications, such as cryptography. 380 years ago, the work of Fermat and Descartes led us to study geometric problems using coordinates and equations. Today, this is the most popular way of handling geometrical problems. Linear algebra provides an efficient tool for studying all the first degree (lines, planes) and second degree (ellipses, hyperboloids) geometric figures, in the affine, the Euclidean, the Hermitian and the projective contexts. But recent applications of mathematics, like cryptography, need these notions not only in real or complex cases, but also in more general settings, like in spaces constructed on finite fields. And of course, why not also turn our attention to geometric figures of higher degrees? Besides all the linear aspects of geometry in their most general setting, this book also describes useful algebraic tools for studying curves of arbitrary degree and investigates results as advanced as the Bezout theorem, the Cramer paradox, topological group of a cubic, rational curves etc. Hence the book is of interest for all those who have to teach or study linear geometry: affine, Euclidean, Hermitian, projective; it is also of great interest to those who do not want to restrict themselves to the undergraduate level of geometric figures of degree one or two.

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