Computational methods in commutative algebra and algebraic geometry

This ACM volume deals with tackling problems that can be represented by data structures which are essentially matrices with polynomial entries, mediated by the disciplines of commutative algebra and algebraic geometry. The discoveries stem from an interdisciplinary branch of research which has been growing steadily over the past decade. The author covers a wide range, from showing how to obtain deep heuristics in a computation of a ring, a module or a morphism, to developing means of solving nonlinear systems of equations - highlighting the use of advanced techniques to bring down the cost of computation. Although intended for advanced students and researchers with interests both in algebra and computation, many parts may be read by anyone with a basic abstract algebra course.

1 Fundamental Algorithms.- 1.1 Groebner Basics.- 1.2 Division Algorithms.- 1.3 Computation of Syzygies.- 1.4 Hilbert Functions.- 1.5 Computer Algebra Systems.- 2 Toolkit.- 2.1 Elimination Techniques.- 2.2 Rings of Endomorphisms.- 2.3 Noether Normalization.- 2.4 Fitting Ideals.- 2.5 Finite and Quasi-Finite Morphisms.- 2.6 Flat Morphisms.- 2.7 Cohen-Macaulay Algebras.- 3 Principles of Primary Decomposition.- 3.1 Associated Primes and Irreducible Decomposition.- 3.2 Equidimensional Decomposition of an Ideal.- 3.3 Equidimensional Decomposition Without Exts.- 3.4 Mixed Primary Decomposition.- 3.5 Elements of Factorizers.- 4 Computing in Artin Algebras.- 4.1 Structure of Artin Algebras.- 4.2 Zero-Dimensional Ideals.- 4.3 Idempotents versus Primary Decomposition.- 4.4 Decomposition via Sampling.- 4.5 Root Finders.- 5 Nullstellensatze.- 5.1 Radicals via Elimination.- 5.2 Modules of Differentials and Jacobian Ideals.- 5.3 Generic Socles.- 5.4 Explicit Nullstellensatze.- 5.5 Finding Regular Sequences.- 5.6 Top Radical and Upper Jacobians.- 6 Integral Closure.- 6.1 Integrally Closed Rings.- 6.2 Multiplication Rings.- 6.3 S2-ification of an Affine Ring.- 6.4 Desingularization in Codimension One.- 6.5 Discriminants and Multipliers.- 6.6 Integral Closure of an Ideal.- 6.7 Integral Closure of a Morphism.- 7 Ideal Transforms and Rings of Invariants.- 7.1 Divisorial Properties of Ideal Transforms.- 7.2 Equations of Blowup Algebras.- 7.3 Subrings.- 7.4 Rings of Invariants.- 8 Computation of Cohomology.- 8.1 Eyeballing.- 8.2 Local Duality.- 8.3 Approximation.- 9 Degrees of Complexity of a Graded Module.- 9.1 Degrees of Modules.- 9.2 Index of Nilpotency.- 9.3 Qualitative Aspects of Noether Normalization.- 9.4 Homological Degrees of a Module.- 9.5 Complexity Bounds in Local Rings.- A A Primer on Commutative Algebra.- A.1 Noetherian Rings.- A.2 Krull Dimension.- A.3 Graded Algebras.- A.4 Integral Extensions.- A.5 Finitely Generated Algebras over Fields.- A.6 The Method of Syzygies.- A.7 Cohen-Macaulay Rings and Modules.- A.8 Local Cohomology.- A.9 Linkage Theory.- B Hilbert Functions.- G-Graded Rings and G-Filtrations.- B.2 The Study ofRvia grF(R).- B.3 The Hilbert-Samuel Function.- B.4 Hilbert Functions, Resolutions and Local Cohomology.- B.5 Lexsegment Ideals and Macaulay Theorem.- B.6 The Theorems of Green and Gotzmann.- C Using Macaulay 2.- C.1 Elementary Uses of Macaulay 2.- C.2 Local Cohomology of Graded Modules.- C.3 Cohomology of a Coherent Sheaf.- References.