Campbell, H.E.A. Eddy
Modular Invariant Theory
1. First Steps
H. E. A. Eddy Campbell, David L. Wehlau
2. Elements of Algebraic Geometry and Commutative Algebra
H. E. A. Eddy Campbell, David L. Wehlau
3. Applications of Commutative Algebra to Invariant Theory
H. E. A. Eddy Campbell, David L. Wehlau
4. Examples
H. E. A. Eddy Campbell, David L. Wehlau
5. Monomial Orderings and SAGBI Bases
H. E. A. Eddy Campbell, David L. Wehlau
6. Block Bases
H. E. A. Eddy Campbell, David L. Wehlau
7. The Cyclic Group
H. E. A. Eddy Campbell, David L. Wehlau
8. Polynomial Invariant Rings
H. E. A. Eddy Campbell, David L. Wehlau
9. The Transfer
H. E. A. Eddy Campbell, David L. Wehlau
10. Invariant Rings via Localization
H. E. A. Eddy Campbell, David L. Wehlau
11. Rings of Invariants which are Hypersurfaces
H. E. A. Eddy Campbell, David L. Wehlau
12. Separating Invariants
H. E. A. Eddy Campbell, David L. Wehlau
13. Using SAGBI Bases to Compute Rings of Invariants
H. E. A. Eddy Campbell, David L. Wehlau
14. Ladders
H. E. A. Eddy Campbell, David L. Wehlau
Keywords: Mathematics, Commutative Rings and Algebras, Algebra, Algebraic Geometry
- Author(s)
- Campbell, H.E.A. Eddy
- Wehlau, David L.
- Publisher
- Springer
- Publication year
- 2011
- Language
- en
- Edition
- 1
- Series
- Encyclopaedia of Mathematical Sciences
- Page amount
- 13 pages
- Category
- Natural Sciences
- Format
- Ebook
- eISBN (PDF)
- 9783642174049