02035aam a2200169 4500008004500000020001800045082001700063100002200080245003900102260004700141300001600188504040100204520119300605650002601798650001601824650002501840191017b 2007 ||||| |||| 00| 0 eng d a9780521691413 a516.35bH2I6 aHassett, Brendan aIntroduction to algebraic geometry bCambridge University Pressc2007aNew York axii, 252 p. aTable of Contens:
Introduction
1. Guiding problems
2. Division algorithm and Gröbner bases
3. Affine varieties
4. Elimination
5. Resultants
6. Irreducible varieties
7. Nullstellensatz
8. Primary decomposition
9. Projective geometry
10. Projective elimination theory
11. Parametrizing linear subspaces
12. Hilbert polynomials and Bezout
Appendix. Notions from abstract algebra
References
Index. aAlgebraic geometry, central to pure mathematics, has important applications in such fields as engineering, computer science, statistics and computational biology, which exploit the computational algorithms that the theory provides. Users get the full benefit, however, when they know something of the underlying theory, as well as basic procedures and facts. This book is a systematic introduction to the central concepts of algebraic geometry most useful for computation. Written for advanced undergraduate and graduate students in mathematics and researchers in application areas, it focuses on specific examples and restricts development of formalism to what is needed to address these examples. In particular, it introduces the notion of Gröbner bases early on and develops algorithms for almost everything covered. It is based on courses given over the past five years in a large interdisciplinary programme in computational algebraic geometry at Rice University, spanning mathematics, computer science, biomathematics and bioinformatics.
https://www.cambridge.org/gb/academic/subjects/mathematics/geometry-and-topology/introduction-algebraic-geometry?format=PB&isbn=9780521691413 aGeometry - Algebraic aMathematics aProjective geometry