1.
EB
edited by András Prékopa, Emil Molnár
2.
EB
by Robert Bix
3.
EB
by John G. Ratcliffe
4.
EB
by Armand Borel, Lizhen Ji
5.
EB
by Titu Andreescu, Oleg Mushkarov, Luchezar Stoyanov
6.
EB
edited by Pavel Etingof, Vladimir Retakh, I. M. Singer
7.
EB
edited by Joseph Bernstein, Vladimir Hinich, Anna Melnikov
8.
EB
by S. Ponnusamy, Herb Silverman
9.
EB
by Malcolm Sabin
10.
EB
by Vladimir Rovenski
出版情報:
New York, NY : Springer Science+Business Media, LLC, 2010
シリーズ名:
Springer Undergraduate Texts in Mathematics and Technology ; 7
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11.
EB
by Alexandre V. Borovik, Anna Borovik
12.
EB
edited by Özgür Ceyhan, Yu. I. Manin, Matilde Marcolli
13.
EB
by Antonio Romano
14.
EB
edited by Ioannis Z. Emiris, Frank Sottile, Thorsten Theobald
15.
EB
edited by Heike Sefrin-Weis
16.
EB
edited by Julien Barral, Stéphane Seuret
17.
EB
by John Stillwell
18.
EB
by Kang Feng, Mengzhao Qin
19.
EB
by Jürgen Richter-Gebert
20.
EB
by Gregory L. Naber
21.
EB
by Emmanuele DiBenedetto
22.
EB
edited by Karl-Hermann Neeb, Arturo Pianzola
23.
EB
edited by Valerio Pascucci, Xavier Tricoche, Hans Hagen, Julien Tierny
24.
EB
by Ahmed Abbes
25.
EB
by Ernest Shult
26.
EB
edited by Luigi Rodino, M. W. Wong, Hongmei Zhu
27.
EB
by Gregory L. Naber
28.
EB
by Alexander Soifer
29.
EB
by Günter Harder
30.
EB
by Robert E. Greene, Kang-Tae Kim, Steven G. Krantz
31.
EB
by Kazuhiko Aomoto, Michitake Kita
32.
EB
by Jean Gallier
33.
EB
by Mark-Christoph Körner
34.
EB
edited by Johan A.C. Kolk, Erik P. van den Ban
35.
EB
by Elisabetta Fortuna, Roberto Frigerio, Rita Pardini
36.
EB
by Eberhard Zeidler
37.
EB
by Johannes Ueberberg
38.
EB
by George K. Francis
目次情報:
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Preface
Descriptive Topology
Methods and Media
Pictures in Perspective
The Impossible Tribar
Shadows from Higher Dimension
Sphere Eversions
Group Pictures
The Figure Eight Knot
Postscript
Bibliography
Index
Preface
Descriptive Topology
Methods and Media
39.
EB
by Michael N. Fried
出版情報:
New York, NY : Springer Science+Business Media, LLC, 2011
シリーズ名:
Sources and Studies in the History of Mathematics and Physical Sciences ;
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http://dx.doi.org/10.1007/978-1-4614-0146-9
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40.
EB
by Marco Abate, Francesca Tovena
41.
EB
edited by Xianzhe Dai, Xiaochun Rong
42.
EB
edited by Leila Floriani, Michela Spagnuolo
43.
EB
by Jeremy J. Gray
44.
EB
by Arthur L. Besse
45.
EB
by Rida T. Farouki
46.
EB
by Jörg Peters, Ulrich Reif ; edited by Herbert Edelsbrunner, Leif Kobbelt, Konrad Polthier
47.
EB
by Michael D. Fried, Moshe Jarden
出版情報:
Berlin, Heidelberg : Springer-Verlag Berlin Heidelberg, 2008
シリーズ名:
Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge / A Series of Modern Surveys in Mathematics ; 11
子書誌情報:
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オンライン:
http://dx.doi.org/10.1007/978-3-540-77270-5
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48.
EB
edited by Mikhail Kapranov, Yuri Ivanovich Manin, Pieter Moree, Sergiy Kolyada, Leonid Potyagailo
49.
EB
by Francesco Catoni, Dino Boccaletti, Roberto Cannata, Vincenzo Catoni, Enrico Nichelatti, Paolo Zampetti
50.
EB
by Stefania Gabelli
51.
EB
by Alexander Soifer
52.
EB
by Alfred Inselberg
53.
EB
edited by Krzysztof Galicki, Santiago R. Simanca
54.
EB
edited by Yuri Tschinkel, Yuri Zarhin
55.
EB
edited by Yuri Tschinkel, Yuri Zarhin
56.
EB
by Titu Andreescu, Răzvan Gelca
57.
EB
by Maria Welleda Baldoni, Ciro Ciliberto, Giulia Maria Piacentini Cattaneo
58.
EB
by Eberhard Zeidler
59.
EB
edited by Gerald Farin, Hans-Christian Hege, David Hoffman, Christopher R. Johnson, Konrad Polthier, Martin Rumf, Hans-Christian Hege, Konrad Polthier, Gerik Scheuermann
60.
EB
by Elena Deza, Michel Marie Deza
61.
EB
edited by Boris Kruglikov, Valentin Lychagin, Eldar Straume
62.
EB
by Michael Kapovich
63.
EB
by Jürgen Jost
64.
EB
by Alexander Soifer
65.
EB
edited by Christian Constanda
66.
EB
SpringerLink (Online service)
67.
EB
by J.M. Aarts
68.
EB
by Alexander Soifer
69.
EB
by Audun Holme
70.
EB
by Károly Bezdek
出版情報:
New York, NY : Springer Science+Business Media, LLC, 2010
シリーズ名:
CMS Books in Mathematics, Ouvrages de mathématiques de la SMC ;
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オンライン:
http://dx.doi.org/10.1007/978-1-4419-0600-7
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71.
EB
edited by Albert W. Grootendorst, Jan Aarts, Miente Bakker, Reinie Erné
72.
EB
by Jeremy Gray
73.
EB
by Martin Aigner, Günter M. Ziegler
74.
EB
by Alexander Ostermann, Gerhard Wanner
75.
EB
edited by Akio Kawauchi, Tomoko Yanagimoto
76.
EB
by Marco Abate, Francesca Tovena
77.
EB
by Lorenza Resta, Sandra Gaudenzi, Stefano Alberghi
78.
EB
by Günter Harder
79.
EB
by Audun Holme
80.
EB
by Kristopher Tapp
81.
EB
edited by Dorian Goldfeld, Jay Jorgenson, Peter Jones, Dinakar Ramakrishnan, Kenneth A. Ribet, John Tate
82.
EB
edited by Ilia Itenberg, Burglind Jöricke, Mikael Passare
83.
EB
by Walter Benz
目次情報:
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Preface
1 Translation Groups
2 Euclidean and Hyperbolic Geometry
3 Sphere Geometries of Möbius and Lie
4 Lorentz Transformations
5 δ–Projective Mappings, Isomorphism Theorems
6 Planes of Leibniz, Lines of Weierstrass, Varia
A Notation and symbols
B Bibliography
Index
Preface
1 Translation Groups
2 Euclidean and Hyperbolic Geometry
84.
EB
by Xinyue Cheng, Zhongmin Shen
目次情報:
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Randers Spaces
Randers Metrics and Geodesics
Randers Metrics of Isotropic S-Curvature
Riemann Curvature and Ricci Curvature
Projective Geometry of Randers Spaces
Randers Metrics with Special Riemann Curvature Properties
Randers Metrics of Weakly Isotropic Flag Curvature.-Projectively Flat Randers Metrics
Conformal Geometry of Randers Metrics
Dually Flat Randers Metrics
Randers Spaces
Randers Metrics and Geodesics
Randers Metrics of Isotropic S-Curvature
85.
EB
by John Barnes
目次情報:
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1 The Golden Number
2 Shapes and Solids
3 The Forth Dimension
4 Projective Geometry
5 Topology
6 Bubbles
7 Harmony of the Spheres
8 Chaos and Fractals
9 Relativity
10 Finale
A More on Four
B Crystals
C Stability
D Stereo Images
E Schlegel Images
F Stability
G Fanoland
Bibliography
Index
1 The Golden Number
2 Shapes and Solids
3 The Forth Dimension
86.
EB
by Ferdinando Arzarello, Cristiano Dané, Laura Lovera, Miranda Mosca, Nicoletta Nolli, Antonella Ronco
87.
EB
edited by A. Bjorner, F. Cohen, C. Concini, C. Procesi, M. Salvetti
目次情報:
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On the structure of spaces of commuting elements in compact Lie groups
On the fundamental group of the complement of two real tangent conics and an arbitrary number of real tangent lines
Intersection cohomology of a rank one local system on the complement of a hyperplane-like divisor
Characters of fundamental groups of curve complements and orbifold pencils
A survey of some recent results concerning polyhedral products
Analytic continuation of a parametric polytope and wall-crossing
Embeddings of braid groups into mapping class groups and their homology
The cohomology of the braid group B3 and of SL2(Z) with coefficients in a geometric representation
Pure braid groups are not residually free
Hodge–Deligne equivariant polynomials and monodromy of hyperplane arrangements
The contravariant form on singular vectors of a projective arrangement
Fox–Neuwirth cell structures and the cohomology of symmetric groups
Basic questions on Artin–Tits groups
Rational cohomology of the real Coxeter toric variety of type A
Arrangements stable under the Coxeter groups
Quantum and homological representations of braid groups
Cohomology of the complement to an elliptic arrangement
Residual nilpotence for generalizations of pure braid groups
Some topological problems on the configuration spaces of Artin and Coxeter groups
Chromatic quasisymmetric functions and Hessenberg varieties
Geometric and homological finiteness in free abelian covers
Minimal stratifications for line arrangements and positive homogeneous presentations for fundamental groups
On the structure of spaces of commuting elements in compact Lie groups
On the fundamental group of the complement of two real tangent conics and an arbitrary number of real tangent lines
Intersection cohomology of a rank one local system on the complement of a hyperplane-like divisor
88.
EB
edited by Marjorie Senechal
目次情報:
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Preface
I First Steps.-1 Introduction to the Polyhedron Kingdom. Marjorie Senechal- 2 Six Recipes for Making Polyhedra. Marion Walter; Jean Pedersen; MagnusWenninger; Doris Schattschneider; Arthur Loeb; and Eric Demaine, Martin Demaine and Vi Hart
3 Regular and Semiregular Polyhedra. H. S. M. Coxeter
4 Milestones in the History of Polyhedra. Joseph Malkevitch
5 Polyhedra: Surfaces or Solids? Arthur Loeb
6 Dürer's Problem. Joseph O'Rourke
II Polyhedra in Nature and Art
7 Exploring the Polyhedron Kingdom. Marjorie Senechal
8 Spatial Perception and Creativity. Janos Baracs
9 Goldberg Polyhedra. George Hart
10 Polyhedra and Crystal Structures. Chung Chieh
11 Polyhedral Molecular Geometries. Magdolna Hargittai and Istvan Hargittai
12 Form, Function, and Functioning. George Fleck
III Polyhedra in the Geometrical Imagination
13 The Polyhedron Kingdom Tomorrow. Marjorie Senechal
14 Paneled and Molecular Polyhedra: How Stable Are They? Ileana Streinu
15 Duality of Polyhedra. Banko Grünbaum and G. C. Shephard
16 Combinatorial Prototiles. Egon Schulte
17 Polyhedra Analogues of the Platonic Solids. Jörg M. Wills
18 Convex Polyhedra, Dirichlet Tessellations, and Spider Webs. Walter Whiteley with Peter Ash, Ethan Bolker, and Henry Crapo
19 Uniform Polyhedra from Diophantine Equations. Barry Monson
20 Torus Decompositions of Regular Polytopes in 4-space. Thomas F. Banchoff
21 Tensegrities and Global Rigidity. Robert Connelly
22 Ten Problems in Geometry. Günter Ziegler and Moritz Schmitt
Notes and References
Sources, Acknowledgments, and Contributors
Index
Preface
I First Steps.-1 Introduction to the Polyhedron Kingdom. Marjorie Senechal- 2 Six Recipes for Making Polyhedra. Marion Walter; Jean Pedersen; MagnusWenninger; Doris Schattschneider; Arthur Loeb; and Eric Demaine, Martin Demaine and Vi Hart
3 Regular and Semiregular Polyhedra. H. S. M. Coxeter
89.
EB
by Tomaž Pisanski, Brigitte Servatius
目次情報:
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Preface
Introduction
Graphs
Groups, Actions, and Symmetry
Maps
Combinatorial Configurations
Geometric Configurations
Index
Bibliography
Preface
Introduction
Graphs
90.
EB
by A.A. Kirillov
目次情報:
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Introduction
Part 1. The Sierpiński Gasket
Definition and General Properties
The Laplace Operator on the Sierpiński Gasket.- Harmonic Functions on the Sierpiński Gasket
Part 2. The Apollonian Gasket
Circles and Disks on Spheres
Definition of the Apollonian Gasket
Arithmetic Properties of Apollonian Gaskets
Geometric and Group-Theoretic Approach
Many-Dimensional Apollonian Gaskets
Bibliography
Introduction
Part 1. The Sierpiński Gasket
Definition and General Properties
91.
EB
edited by Julien Barral, Stéphane Seuret
目次情報:
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The Rauzy Gasket
On the Hausdorff Dimension of Graphs of Prevalent Continuous Functions on Compact Sets
Hausdorff Dimension and Diophantine Approximation
Singular Integrals on Self-Similar Subsets of Metric Groups
Multivariate Davenport Series
Dimensions of Self-Affine Sets
The Multifractal Spectra of V-Statistics
Projections of Measures Invariant Under the Geodesic Flow
Multifractal Tubes
The Multiplicative Golden Mean Shift has Infinite Hausdorff Measure
The Law of Iterated Logarithm and Equilibrium Measures Versus Hausdorff Measures For Dynamically Semi-Regular Meromorphic Functions
Cookie-Cutter-Like Sets with Graph Directed Construction
Recent Developments on Fractal Properties of Gaussian Random Fields.
The Rauzy Gasket
On the Hausdorff Dimension of Graphs of Prevalent Continuous Functions on Compact Sets
Hausdorff Dimension and Diophantine Approximation
92.
EB
by Michael Joswig, Thorsten Theobald
目次情報:
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Introduction and Overview
Geometric Fundamentals
Polytopes and Polyhedra
Linear Programming
Computation of Convex Hulls
Voronoi Diagrams
Delone Triangulations
Algebraic and Geometric Foundations
Gröbner Bases and Buchberger’s Algorithm
Solving Systems of Polynomial Equations Using Gröbner Bases
Reconstruction of Curves
Plücker Coordinates and Lines in Space
Applications of Non-Linear Computational Geometry
Algebraic Structures
Separation Theorems
Algorithms and Complexity
Software
Notation
Introduction and Overview
Geometric Fundamentals
Polytopes and Polyhedra
93.
EB
by Boris Makarov, Anatolii Podkorytov
目次情報:
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Measure
The Lebesgue Model
Measurable Functions
The Integral
The Product Measure
Change of Variables in an Integral
Integrals Dependent on a Parameter
Surface Integrals
Approximation and Convolution of the Space
Fourier Series and the Fourier Transform
Charges. The Radon-Nikodym Theory
Integral Representation of Linear Functionals
Appendices
Measure
The Lebesgue Model
Measurable Functions
94.
EB
edited by János Pach
目次情報:
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Introduction
1) B. Ábrego - S. Fernández-Merchant - G. Salazar: The rectilinear crossing number of K_n: closing in (or are we?)
2) E. Ackerman: The maximum number of tangencies among convex regions with a triangle-free intersection graph
3) G. Aloupis - B. Ballinger - S. Collette - S. Langerman - A. Pór - D.R.Wood: Blocking coloured point sets
4) M. Al-Jubeh - G. Barequet - M. Ishaque - D. Souvaine - Cs. D. Tóth - A. Winslow: Constrained tri-connected planar straight line graphs
5) S. Buzaglo - R. Pinchasi - G. Rote: Topological hypergraphs
6) J. Cano Vila - L. F. Barba - J. Urrutia - T. Sakai: On edge-disjoint empty triangles of point sets
7) J. Cibulka - J. Kynčl - V. Mészáros - R. Stolař - P. Valtr: Universal sets for straight-line embeddings of bicolored graphs
8) G. Di Battista - F. Frati: Drawing trees, outerplanar graphs, series-parallel graphs, and planar graphs in small area
9) W. Didimo - G. Liotta: The crossing angle resolution in graph drawing
10) A. Dumitrescu: Mover problems
11) S. Felsner: Rectangle and square representations of planar graphs
12) R. Fulek - N. Saeedi - D. Sariöz: Convex obstacle numbers of outerplanar graphs and bipartite permutation graphs
13) R. Fulek - M. Pelsmajer - M. Schaefer - D. Štefankovič: Hanani-Tutte, monotone drawings, and level-planarity
14) R. Fulek - A. Suk: On disjoint crossing families in geometric graphs
15) M. Hoffmann - A. Schulz - M. Sharir - A. Sheffer - Cs. D. Tóth - E. Welzl: Counting plane graphs: flippability and its applications
16) F. Hurtado - Cs. D. Tóth: Geometric graph augmentation: a generic perspective
17) M. Kano - K. Suzuki: Discrete geometry on red and blue points in the plane lattice
18) Gy. Károlyi: Ramsey-type problems for geometric graphs
19) Ch. Keller - M. Perles - E. Rivera-Campo - V. Urrutia-Galicia: Blockers for non-crossing spanning trees in complete geometric graphs
20) A. V. Kostochka - K. G. Milans: Coloring clean and K_4-free circle graphs
21) F. Morić - D. Pritchard: Counting large distances in convex polygons: a computational approach
22) A. Raigorodskii: Coloring distance graphs and graphs of diameters
23) M. Schaefer: Realizability of graphs and linkages
24) C. Smyth: Equilateral sets in l_dp
25) A. Suk: A note on geometric 3-hypergraphs
26) K. Swanepoel: Favourite distances in high dimensions
27) M. Tancer: Intersection patterns of convex sets via simplicial complexes, a survey
28) G. Tardos: Construction of locally plane graphs with many edges
29) G. Tóth: A better bound for the pair-crossing number
30) U. Wagner: Minors, embeddability, and extremal problems for hypergraphs
Introduction
1) B. Ábrego - S. Fernández-Merchant - G. Salazar: The rectilinear crossing number of K_n: closing in (or are we?)
2) E. Ackerman: The maximum number of tangencies among convex regions with a triangle-free intersection graph
95.
EB
edited by Antonio Mucherino, Carlile Lavor, Leo Liberti, Nelson Maculan
目次情報:
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Preface
1. Universal Rigidity of Bar Frameworks in General Position (A. Alfakih)
2. Mixed Volume and Distance Geometry Techniques for Counting Euclidean Embeddings of Rigid Graphs (I. Emiris, E. Tsigaridas, A. Varvitsiotis)
3. (The discretizable molecular distance Geometry Problem Seems Easier on Proteins (L. Liberti, C. Lavor, A. Mucherino)
4. Spheres Unions and Intersections and Some of Their Applications in Molecular Modeling (M. Petitjean)
5. Is the Distance Geometry Problem in NP? (N. Beeker, S. Gaubert, C. Glusa, L. Liberti)
6. Solving Spatial Constraints with Generalized Distance Geometry (L. Yang)
7. A Topological Interpretation of the Walk Distances (P. Chebotarev, M. Deza)
8. Distance Geometry Methods for Protein Structure Determination (Z. Voller, Z. Wu)
9. Solving the discretizable molecular distance geometry problem by multiple realization trees (P. Nucci, L. Nogueira, C. Lavor)
10.-ASAP - An Eigenvector Synchronization Algorithm for the Graph Realization Problem (M. Cucuringu)
11. Global Optimization for Atomic Cluster Distance Geometry Problems (M. Locatelli, F. Schoen)
12. Solving molecular distance geometry problems using a continuous optimization approach (R. Lima, J.M. Martinez)
13. DC Programming Approaches for Distance Geometry Problems (H. Thi, T. Dinh)
14. Stochastic Proximity Embedding (D. Agrafiotis, D. Bandyopadhyay, E. Yang)
15. Distance Geometry for Realistic Molecular Conformations
16. Distance Geometry in Structural Biology (T. Malliavin, A. Mucherino, M. Nilges)
17. Using a Distributed SDP Approach to Solve Simulated Protein Molecular Conformation Problems (X. Fang, K-C. Toh)
18. An Overview on Protein Structure Determintion by NMR - Historical and Future Perspectives of the Use of Distance Geometry Methods.-Index
Preface
1. Universal Rigidity of Bar Frameworks in General Position (A. Alfakih)
2. Mixed Volume and Distance Geometry Techniques for Counting Euclidean Embeddings of Rigid Graphs (I. Emiris, E. Tsigaridas, A. Varvitsiotis)
96.
EB
edited by Fedor Bogomolov, Brendan Hassett, Yuri Tschinkel
目次情報:
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Foreword
Introduction.- A. Bertram and I. Coskun, The birational geometry of the Hilbert scheme of points on surfaces
F. Bogomolov and Ch. Böhning, Isoclinism and stable cohomology of wreath products
F. Bogomolov, I. Karzhemanov, and K. Kuyumzhiyan, Unirationality and existence of infinitely transitive models
I. Cheltsov, L. Katzarkov, and V. Przyjalkowski, Birational geometry via moduli spaces
O. Debarre, Curves of low degrees on projective varieties
S. Kebekus, Uniruledness criteria and applications
S. Kovács, The cone of curves of K3 surfaces revisited
V. Lazić, Around and beyond the canonical class
C. Liedtke, Algebraic surfaces in positive characteristic
A. Varilly-Alvarado, Arithmetic of Del Pezzo surfaces
Foreword
Introduction.- A. Bertram and I. Coskun, The birational geometry of the Hilbert scheme of points on surfaces
F. Bogomolov and Ch. Böhning, Isoclinism and stable cohomology of wreath products
97.
EB
by Sotirios E. Louridas, Michael Th. Rassias
目次情報:
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Foreword
Preface
Basic Concepts and Theorems of Euclidean Geometry
Methods of Analysis, Synthesis, Construction and Proof.-Geometrical Constructions
Geometrical Loci
Problems of Olympiad Caliber
Solutions of the Problems
Bibliography
Index
Foreword
Preface
Basic Concepts and Theorems of Euclidean Geometry
98.
EB
by Michel Marie Deza, Elena Deza
目次情報:
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Part I. Mathematics of Distances
1 General Definitions
2 Topological Spaces
3 Generalization of Metric Spaces
4 Metric Transforms
5 Metrics on Normed Structures
Part II. Geometry and Distances
6 Distances in Geometry
7 Riemannian and Hermitian Metrics
8 Distances on Surfaces and Knots
9 Distances on Convex Bodies, Cones and Simplicial Complexes
Part III. Distances in Classical Mathematics
10 Distances in Algebra
11 Distances on Strings and Permutations
12 Distances on Numbers, Polynominals and Matrices
13 Distances in Functional Analysis
14 Distances in Probability Theory
Part IV. Distances in Applied Mathematics
15 Distances in Graph theory
16 Distances in Coding Theory
17 Distances and Similarities in Data Analysis
18 Distances in Systems and Mathematical Engineering
Part V. Computer-Related Distances
19 Distances on Real and Digital Planes
20 Voronoi Diagram Distances
21 Image and Audio Distances
22 Distances in Networks
Part VI. Distances in Natural Sciences
23 Distances in Biology
24 Distances in Physics and Chemistry
25 Distances in Earth Science and Astronomy
26 Distances in Cosmology and Theory of Relativity
Part VII. Real-World Distances
27 Length Measures and Scales
28 Distances in Applied Social Sciences
29 Other Distances
Part I. Mathematics of Distances
1 General Definitions
2 Topological Spaces
99.
EB
by Igor R. Shafarevich, Alexey O. Remizov
目次情報:
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Preface
Preliminaries
1. Linear Equations
2. Matrices and Determinants
3. Vector Spaces
4. Linear Transformations of a Vector Space to Itself
5. Jordan Normal Form
6. Quadratic and Bilinear Forms
7. Euclidean Spaces
8. Affine Spaces
9. Projective Spaces
10. The Exterior Product and Exterior Algebras
11. Quadrics
12. Hyperbolic Geometry
13. Groups, Rings, and Modules
14. Elements of Representation Theory
Historical Note
References
Index
Preface
Preliminaries
1. Linear Equations
100.
EB
by Dietmar Hildenbrand
目次情報:
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Chap. 1 Introduction
Chap. 2 Mathematical Introduction
Chap. 3 The Conformal Geometric Algebra
Chap. 4 Maple and the Identification of Quaternions and Other Algebras
Chap. 5 Fitting of Planes or Spheres into Point Sets
Chap. 6 Geometric Algebra Tutorial Using CLUCalc
Chap. 7 Inverse Kinematics of a Simple Robot
Chap. 8 Robot Grasping an Object
Chap. 9 Efficient Computer Animation Application in CGA
Chap. 10 Using Gaalop for Performant Geometric Algebra Computing
Chap. 11 Collision Detection Using the Gaalop Precompiler
Chap. 12 Gaalop Precompiler for GPGPUs
Chap. 13 Molecular Dynamics Using Gaalop GPC for OpenCL
Chap. 14 Geometric Algebra Computers
Chap. 1 Introduction
Chap. 2 Mathematical Introduction
Chap. 3 The Conformal Geometric Algebra