rent-now

Rent More, Save More! Use code: ECRENTAL

5% off 1 book, 7% off 2 books, 10% off 3+ books

9783540330981

Algorithms in Real Algebraic Geometry

by ; ;
  • ISBN13:

    9783540330981

  • ISBN10:

    3540330984

  • Edition: 2nd
  • Format: Hardcover
  • Copyright: 2006-08-18
  • Publisher: Springer-Nature New York Inc
  • Purchase Benefits
  • Free Shipping Icon Free Shipping On Orders Over $35!
    Your order must be $35 or more to qualify for free economy shipping. Bulk sales, PO's, Marketplace items, eBooks and apparel do not qualify for this offer.
  • eCampus.com Logo Get Rewarded for Ordering Your Textbooks! Enroll Now
  • Write a Review Icon Write a Review
List Price: $119.99 Save up to $87.95
  • Digital
    $69.42*
    Add to Cart

    DURATION
    PRICE
    *To support the delivery of the digital material to you, a digital delivery fee of $3.99 will be charged on each digital item.

Summary

The algorithmic problems of real algebraic geometry such as real root counting, deciding the existence of solutions of systems of polynomial equations and inequalities, or deciding whether two points belong in the same connected component of a semi-algebraic set occur in many contexts. In this first-ever graduate textbook on the algorithmic aspects of real algebraic geometry, the main ideas and techniques presented form a coherent and rich body of knowledge, linked to many areas of mathematics and computing.Mathematicians already aware of real algebraic geometry will find relevant information about the algorithmic aspects, and researchers in computer science and engineering will find the required mathematical background.Being self-contained the book is accessible to graduate students and even, for invaluable parts of it, to undergraduate students.

Table of Contents

Introduction 1(350)
1 Algebraically Closed Fields
11(18)
1.1 Definitions and First Properties
11(3)
1.2 Euclidean Division and Greatest Common Divisor
14(6)
1.3 Projection Theorem for Constructible Sets
20(5)
1.4 Quantifier Elimination and the Transfer Principle
25(2)
1.5 Bibliographical Notes
27(2)
2 Real Closed Fields
29(54)
2.1 Ordered, Real and Real Closed Fields
29(15)
2.2 Real Root Counting
44(13)
2.2.1 Descartes's Law of Signs and the Budan-Fourier Theorem
44(8)
2.2.2 Sturm's Theorem and the Cauchy Index
52(5)
2.3 Projection Theorem for Algebraic Sets
57(6)
2.4 Projection Theorem for Semi-Algebraic Sets
63(6)
2.5 Applications
69(5)
2.5.1 Quantifier Elimination and the Transfer Principle
69(2)
2.5.2 Semi-Algebraic Functions
71(1)
2.5.3 Extension of Semi-Algebraic Sets and Functions
72(2)
2.6 Puiseux Series
74(7)
2.7 Bibliographical Notes
81(2)
3 Semi-Algebraic Sets
83(18)
3.1 Topology
83(3)
3.2 Semi-algebraically Connected Sets
86(1)
3.3 Semi-algebraic Germs
87(6)
3.4 Closed and Bounded Semi-algebraic Sets
93(1)
3.5 Implicit Function Theorem
94(5)
3.6 Bibliographical Notes
99(2)
4 Algebra
101(58)
4.1 Discriminant and Subdiscriminant
101(4)
4.2 Resultant and Subresultant Coefficients
105(14)
4.2.1 Resultant
105(5)
4.2.2 Subresultant Coefficients
110(3)
4.2.3 Subresultant Coefficients and Cauchy Index
113(6)
4.3 Quadratic Forms and Root Counting
119(13)
4.3.1 Quadratic Forms
119(8)
4.3.2 Hermite's Quadratic Form
127(5)
4.4 Polynomial Ideals
132(11)
4.4.1 Hilbert's Basis Theorem
132(4)
4.4.2 Hilbert's Nullstellensatz
136(7)
4.5 Zero-dimensional Systems
143(6)
4.6 Multivariate Hermite's Quadratic Form
149(4)
4.7 Projective Space and a Weak Bézout's Theorem
153(4)
4.8 Bibliographical Notes
157(2)
5 Decomposition of Semi-Algebraic Sets
159(36)
5.1 Cylindrical Decomposition
159(9)
5.2 Semi-algebraically Connected Components
168(2)
5.3 Dimension
170(2)
5.4 Semi-algebraic Description of Cells
172(2)
5.5 Stratification
174(7)
5.6 Simplicial Complexes
181(2)
5.7 Triangulation
183(3)
5.8 Hardt's Triviality Theorem and Consequences
186(5)
5.9 Semi-algebraic Sard's Theorem
191(3)
5.10 Bibliographical Notes
194(1)
6 Elements of Topology
195(42)
6.1 Simplicial Homology Theory
195(26)
6.1.1 The Homology Groups of a Simplicial Complex
195(4)
6.1.2 Simplicial Cohomology Theory
199(2)
6.1.3 A Characterization of H¹ in a Special Case.
201(5)
6.1.4 The Mayer-Vietoris Theorem
206(3)
6.1.5 Chain Homotopy
209(4)
6.1.6 The Simplicial Homology Groups Are Invariant Under Homeomorphism
213(8)
6.2 Simplicial Homology of Closed and Bounded Semi-algebraic Sets
221(5)
6.2.1 Definitions and First Properties
221(2)
6.2.2 Homotopy
223(3)
6.3 Homology of Certain Locally Closed Semi-Algebraic Sets
226(10)
6.3.1 Homology of Closed Semi-algebraic Sets and of Sign Conditions
226(2)
6.3.2 Homology of a Pair
228(3)
6.3.3 Borel-Moore Homology
231(3)
6.3.4 Euler-Poincaré Characteristic
234(2)
6.4 Bibliographical Notes
236(1)
7 Quantitative Semi-algebraic Geometry
237(44)
7.1 Morse Theory
237(19)
7.2 Sum of the Betti Numbers of Real Algebraic Sets
256(6)
7.3 Bounding the Betti Numbers of Realizations of Sign Conditions
262(6)
7.4 Sum of the Betti Numbers of Closed Semi-algebraic Sets
268(5)
7.5 Sum of the Betti Numbers of Semi-algebraic Sets
273(7)
7.6 Bibliographical Notes
280(1)
8 Complexity of Basic Algorithms
281(42)
8.1 Definition of Complexity
281(11)
8.2 Linear Algebra
292(9)
8.2.1 Size of Determinants
292(2)
8.2.2 Evaluation of Determinants
294(5)
8.2.3 Characteristic Polynomial
299(1)
8.2.4 Signature of Quadratic Forms
300(1)
8.3 Remainder Sequences and Subresultants
301(21)
8.3.1 Remainder Sequences
301(2)
8.3.2 Signed Subresultant Polynomials
303(4)
8.3.3 Structure Theorem for Signed Subresultants
307(7)
8.3.4 Size of Remainders and Subresultants
314(2)
8.3.5 Specialization Properties of Subresultants
316(1)
8.3.6 Subresultant Computation
317(5)
8.4 Bibliographical Notes
322(1)
9 Cauchy Index and Applications
323(28)
9.1 Cauchy Index
323(10)
9.1.1 Computing the Cauchy Index
323(3)
9.1.2 Bezoutian and Cauchy Index
326(4)
9.1.3 Signed Subresultant Sequence and Cauchy Index on an Interval
330(3)
9.2 Hankel Matrices
333(11)
9.2.1 Hankel Matrices and Rational Functions
334(3)
9.2.2 Signature of Hankel Quadratic Forms
337(7)
9.3 Number of Complex Roots with Negative Real Part
344(6)
9.4 Bibliographical Notes
350(1)
10 Real Roots 351(52)
10.1 Bounds on Roots
351(9)
10.2 Isolating Real Roots
360(23)
10.3 Sign Determination
383(14)
10.4 Roots in a Real Closed Field
397(4)
10.5 Bibliographical Notes
401(2)
11 Cylindrical Decomposition Algorithm 403(42)
11.1 Computing the Cylindrical Decomposition
404(11)
11.1.1 Outline of the Method
404(4)
11.1.2 Details of the Lifting Phase
408(7)
11.2 Decision Problem
415(8)
11.3 Quantifier Elimination
423(3)
11.4 Lower Bound for Quantifier Elimination
426(2)
11.5 Computation of Stratifying Families
428(2)
11.6 Topology of Curves
430(10)
11.7 Restricted Elimination
440(4)
11.8 Bibliographical Notes
444(1)
12 Polynomial System Solving 445(60)
12.1 A Few Results on Graner Bases
445(6)
12.2 Multiplication Tables
451(5)
12.3 Special Multiplication Table
456(6)
12.4 Univariate Representation
462(9)
12.5 Limits of the Solutions of a Polynomial System
471(12)
12.6 Finding Points in Connected Components of Algebraic Sets
483(12)
12.7 Triangular Sign Determination
495(3)
12.8 Computing the Euler-Poincaré Characteristic of an Algebraic Set
498(5)
12.9 Bibliographical Notes
503(2)
13 Existential Theory of the Reals 505(28)
13.1 Finding Realizable Sign Conditions
506(10)
13.2 A Few Applications
516(3)
13.3 Sample Points on an Algebraic Set
519(9)
13.4 Computing the Euler-Poincaré Characteristic of Sign Conditions
528(4)
13.5 Bibliographical Notes
532(1)
14 Quantifier Elimination 533(30)
14.1 Algorithm for the General Decision Problem
534(13)
14.2 Quantifier Elimination
547(4)
14.3 Local Quantifier Elimination
551(6)
14.4 Global Optimization
557(1)
14.5 Dimension of Semi-algebraic Sets
558(4)
14.6 Bibliographical Notes
562(1)
15 Computing Roadmaps and Connected Components of Algebraic Sets 563(30)
15.1 Pseudo-critical Values and Connectedness
564(4)
15.2 Roadmap of an Algebraic Set
568(12)
15.3 Computing Connected Components of Algebraic Sets
580(12)
15.4 Bibliographical Notes
592(1)
16 Computing Roadmaps and Connected Components of Semi-algebraic Sets 593(42)
16.1 Special Values
593(8)
16.2 Uniform Roadmaps
601(7)
16.3 Computing Connected Components of Sign Conditions
608(6)
16.4 Computing Connected Components of a Semi-algebraic Set
614(3)
16.5 Roadmap Algorithm
617(10)
16.6 Computing the First Betti Number of Semi-algebraic Sets
627(6)
16.7 Bibliographical Notes
633(2)
References 635(10)
Index of Notation 645(10)
Index 655

Supplemental Materials

What is included with this book?

The New copy of this book will include any supplemental materials advertised. Please check the title of the book to determine if it should include any access cards, study guides, lab manuals, CDs, etc.

The Used, Rental and eBook copies of this book are not guaranteed to include any supplemental materials. Typically, only the book itself is included. This is true even if the title states it includes any access cards, study guides, lab manuals, CDs, etc.

Rewards Program