A Singular Introduction to Commutative Algebra - Softcover

Synopsis

1 Rings, Ideals and Standard Bases 1.1 Rings, Polynomials and Ring Maps 1.2 Monomial Orderings 1.3 Ideals and Quotient Rings 1.4 Local Rings and Localization 1.5 Rings Associated to Monomial Orderings 1.6 Normal Forms and Standard Bases 1.7 The Standard Basis Algorithm 1.8 Operations on Ideals and their Computation 1.8.1 Ideal membership 1.8.2 Intersection with subrings (elimination of variables) 1.8.3 Zariski closure of the image 1.8.4 Solvability of polynomial equations 1.8.5 Solving polynomial equations 1.8.6 Radical membership 1.8.7 Intersection of ideals 1.8.8 Quotient of ideals 1.8.9 Saturation 1.8.10 Kernel of a ring map 1.8.11 Algebraic dependence and subalgebra membership 2. Modules 2.1 Modules, Submodules and Homomorphisms 2.2 Graded Rings and Modules 2.3 Standard Bases for Modules 2.4 Exact Sequences and free Resolutions 2.5 Computing Resolutions and the Syzygy Theorem 2.6 Modules over Principal Ideal Domains 2.7 Tensor Product 2.8 Operations with modules 2.8.1 Module membership problem 2.8.2 Elimination of module components 2.8.3 Quotients of submodules 2.8.4 Kernel of a module homomorphism 3. Noether Normalization and Applications 3.1 Finite and Integral Extensions 3.2 The Integral Closure 3.3 Dimension 3.4 Noether Normalization 3.5 Applications 3.6 An Algorithm to Compute the Normalization 3.7 Procedures 4. Primary Decomposition and Related Topics 4.1 The Theory of Primary Decomposition 4.2 Zero--dimensional Primary Decomposition 4.3 Higher Dimensional Primary Decomposition 4.4 The Equidimensional Part of an Ideal 4.5 The Radical 4.6 Procedures 5. Hilbert Function 5.1 The Hilbert Function and the Hilbert Polynomial 5.2 Examples and Computation of the Hilbert--Poincare Series 5.3 Properties of the Hilbert Polynomial 5.4 Filtrations and the Lemma of Artin--Rees 5.5 The Hilbert--Samuel Function 5.6 Characterization of the Dimension of Local Rings 5.7 Singular Locus 6. Complete Local Rings 6.1 Formal Power Series Rings 6.2 Weierstrass Preparation Theorem 6.3 Completions 6.4 Standard bases 7. Homological Algebra 7.1 Tor 7.2 Fitting Ideals 7.3 Flatness 7.4 Local Criteria for Flatness 7.5 Flatness and Standard Bases 7.6 Koszul Complex 7.7 Cohen-Macaulay Rings 7.8 Further Characterization of Cohen-Macaulayness A. Geometric Background A.1 Introduction by Pictures A.2 Affine algebraic varieties A.3 Spectrum and Affine Schemes A.4 Projective Varieties and Projective Schemes A.5 Morphisms between Varieties A.6 Projective Morphisms and elimination A.7 Local versus Global Properties A.8 Singularities B. SINGULAR - A Short Introduction B.1 Downloading Instructions B.2 Getting Started B.3 Procedures and Libraries B.4 Data Types B.5 Functions B.6 Control Structures B.7 System variables SINGULAR Reference Manual Index Glossary

"synopsis" may belong to another edition of this title.