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Plane Algebraic Curves: Translated by John Stillwell de Egbert Brieskorn

Plane Algebraic Curves: Translated by John Stillwell: Modern Birkhäuser Classics

Autor Egbert Brieskorn, Horst Knörrer Traducere de John Stillwell
en Limba Engleză Paperback – 26 aug 2012
In a detailed and comprehensive introduction to the theory of plane algebraic curves, the authors examine this classical area of mathematics that both figured prominently in ancient Greek studies and remains a source of inspiration and a topic of research to this day. Arising from notes for a course given at the University of Bonn in Germany, “Plane Algebraic Curves” reflects the authorsʼ concern for the student audience through its emphasis on motivation, development of imagination, and understanding of basic ideas. As classical objects, curves may be viewed from many angles. This text also provides a foundation for the comprehension and exploration of modern work on singularities.
---  
In the first chapter one finds many special curves with very attractive geometric presentations ‒ the wealth of illustrations is a distinctive characteristic of this book ‒ and an introduction to projective geometry (over the complex numbers). In the second chapter one finds a very simple proof of Bezout’s theorem and a detailed discussion of cubics. The heart of this book ‒ and how else could it be with the first author ‒ is the chapter on the resolution of singularities (always over the complex numbers).  (…) Especially remarkable is the outlook to further work on the topics discussed, with numerous references to the literature. Many examples round off this successful representation of a classical and yet still very much alive subject.
(Mathematical Reviews)
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Specificații

ISBN-13: 9783034804929
ISBN-10: 303480492X
Pagini: 732
Ilustrații: X, 721 p. 301 illus.
Dimensiuni: 155 x 235 x 41 mm
Greutate: 1.01 kg
Ediția:2012
Editura: Springer
Colecția Birkhäuser
Seria Modern Birkhäuser Classics

Locul publicării:Basel, Switzerland

Public țintă

Research

Cuprins

I. History of algebraic curves.- 1. Origin and generation of curves.- 2. Synthetic and analytic geometry.- 3. The development of projective geometry.- II. Investigation of curves by elementary algebraic methods.- 4. Polynomials.- 5. Definition and elementary properties of plane algebraic curves.- 6. The intersection of plane curves.- 7. Some simple types of curves.- III. Investigation of curves by resolution of singularities.- 8. Local investigations.- 9. Global investigations.- Bibliography.- Index.​

Recenzii

“It provides a comprehensive overview for all who are interested in GO with an emphasis on theory and algorithms.” (W. Huyer, Monatshefte für Mathematik, 2015)
“This is a masterly expositional work in which the conversational style of narrative never leaves the reader in doubt about the direction of enquiry. … the richness of this publication really resides in the fascinating range of mathematical ideas that support its main line of enquiry. … it can be read selectively at so many different levels up to the postgraduate stage.” (PeterRuane,The Mathematical Association of America, January, 2013)

Notă biografică

Egbert Brieskorn was a Professor of Mathematics at the University of Bonn, Germany.
Horst Knörrer is a Professor of Mathematics at the ETH Zurich, Switzerland.

Textul de pe ultima copertă

In a detailed and comprehensive introduction to the theory of plane algebraic curves, the authors examine this classical area of mathematics that both figured prominently in ancient Greek studies and remains a source of inspiration and topic of research to this day. Arising from notes for a course given at the University of Bonn in Germany, “Plane Algebraic Curves” reflects the author’s concern for the student audience through emphasis upon motivation, development of imagination, and understanding of basic ideas. As classical objects, curves may be viewed from many angles; this text provides a foundation for the comprehension and exploration of modern work on singularities.  
---  
In the first chapter one finds many special curves with very attractive geometric presentations – the wealth of illustrations is a distinctive characteristic of this book – and an introduction to projective geometry (over the complex numbers). In the second chapter one finds a very simpleproof of Bezout’s theorem and a detailed discussion of cubics. The heart of this book – and how else could it be with the first author – is the chapter on the resolution of singularities (always over the complex numbers).  (…) Especially remarkable is the outlook to further work on the topics discussed, with numerous references to the literature. Many examples round off this successful representation of a classical and yet still very much alive subject.
(Mathematical Reviews)

Caracteristici

Lively introduction and overview of the field Anchors the subject in history, science and technology Clearly explains the tools from local analytic geometry and from algebraic and differential topology Presents a wealth of attractive geometric illustrations ? Includes supplementary material: sn.pub/extras