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Das Buch bietet die Möglichkeit, geometrisches Wissen und Verständnis zu gewinnen, das in fortgeschrittenen Vorlesungen häufig vorausgesetzt, im Grundstudium aber selten geboten wird. Ausgehend von elementaren Kenntnissen in Linearer Algebra und Analysis wird eine Fülle von konkreten geometrischen Tatsachen dargestellt. Dabei steht die Anschauung im Vordergrund, präzise Beweise fehlen aber nie. Auf die Bedürfnisse der Physik wird besondere Rücksicht genommen. Die einzelnen Kapitel des Buches können unabhängig voneinander gelesen werden. Im Text und in ergänzenden Bemerkungen wird aber immer wieder auf die Beziehungen der einzelnen Themenkreise untereinander und zu anderen Gebieten der Mathematik und der Physik hingewiesen. Für die Neuauflage dieses Buches wurde der Text behutsam verbessert und aktualisiert.
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Geometry, Projective --- Curves, Plane --- Curves, Algebraic --- 512.77 --- #WWIS:d.d. Prof. L. Bouckaert/ALTO --- Projective geometry --- Geometry, Modern --- Higher plane curves --- Plane curves --- Algebraic curves --- Algebraic varieties --- Algebraic curves. Algebraic surfaces. Three-dimensional algebraic varieties --- 512.77 Algebraic curves. Algebraic surfaces. Three-dimensional algebraic varieties
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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 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).
Curves, Algebraic. --- Curves, Plane. --- Geometry, Projective. --- Curves, Algebraic --- Curves, Plane --- Geometry, Projective --- Mathematics --- Physical Sciences & Mathematics --- Geometry --- Projective geometry --- Higher plane curves --- Plane curves --- Algebraic curves --- Mathematics. --- Algebraic geometry. --- Commutative algebra. --- Commutative rings. --- Algebraic topology. --- Algebraic Geometry. --- Commutative Rings and Algebras. --- Algebraic Topology. --- Geometry, Modern --- Algebraic varieties --- Geometry, algebraic. --- Algebra. --- Topology --- Mathematical analysis --- Algebraic geometry --- Rings (Algebra) --- Algebra
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Algebraic geometry --- Curves, Algebraic --- Curves, Plane --- Geometry, projective
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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 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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