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Inhaltsverzeichnis
- I. A First Look at Semialgebraic Geometry.
- 1. Real Closed Fields and Transfer Principles.
- 2. What is Semialgebraic Geometry?.
- 3. Real Spaces.
- 4. Examples.
- II. Real Algebra.
- 1. The Real Spectrum of a Ring.
- 2. Specializations, Zero Sets and Real Ideals.
- 3. Real Valuations.
- 4. Real Going-Up and Real Going-Down.
- 5. Abstract Semialgebraic Functions.
- 6. Cylindrical Decomposition.
- 7. Real Strict Localization.
- Notes.
- III. Spaces of Signs.
- 1. The Axioms.
- 2. Forms.
- 3. SAP-Spaces and Fans.
- 4. Local Spaces of Signs.
- 5. The Space of Signs of a Ring.
- 6. Subspaces.
- IV. Spaces of Orderings.
- 1. The Axioms Revisited.
- 2. Basic Constructions.
- 3. Spaces of Finite Type.
- 4. Spaces of Finite Chain Length.
- 5. Finite Type = Finite Chain Length.
- 6. Local-Global Principles.
- 7. Representation Theorem and Invariants.
- V. The Main Results.
- 1. Stability Formulae.
- 2. Complexity of Constructible Sets.
- 3. Separation.
- 4. Real Divisors.
- 5. The Artin-Lang Property.
- VI. Spaces of Signs of Rings.
- 1. Fans and Valuations.
- 2. Field Extensions: Upper Bounds.
- 3. Field Extensions: Lower Bounds.
- 4. Algebras.
- 5. Algebras Finitely Generated over Fields.
- 6. Archimedean Rings.
- 7. Coming Back to Geometry.
- VII. Real Algebra of Excellent Rings.
- 1. Regular Homomorphisms.
- 2. Excellent Rings.
- 3. Extension of Orderings Under Completion.
- 4. Curve Selection Lemma.
- 5. Dimension, Valuations and Fans.
- 6. Closures of Constructible Sets.
- 7. Real Going-down for Regular Homomorphisms.
- 8. Connected Components of Constructible Sets.
- VIII. Real Analytic Geometry.
- 1. Semianalytic Sets.
- 2. Semianalytic Set Germs.
- 3. Cylindrical Decomposition of Germs.
- 4. Rings of Global Analytic Functions.
- 5. Hilbert’s 17th Problem and Real Nullstellensatz.
- 6. Minimal Generation of Global Semianalytic Sets.
- 7. Topology of Global Semianalytic Sets.
- 8. Germs at Compact Sets.
