New trends in intuitive geometry. (2018)
- Record Type:
- Book
- Title:
- New trends in intuitive geometry. (2018)
- Main Title:
- New trends in intuitive geometry
- Further Information:
- Note: Gergely Ambrus, Imre Bárány, Károly J. Böröczky, Gábor Fejes Tóth, János Pach, editors.
- Editors:
- Ambrus, Gergely
Bárány, Imre
Böröczky, K
Ph. D, Tóth, Gábor
Pach, János - Contents:
- Intro; Preface; Contents; The Tensorization Trick in Convex Geometry; 1 Introduction; 1.1 Tensor Power; 1.2 Tensor Powers and Polynomials; 1.3 Chebyshev Polynomials; 2 Packing Points in the Sphere; 2.1 Packing Points in the Sphere; 3 Approximating a Norm by a Polynomial and a Convex Body by an Algebraic Hypersurface; 3.1 Norms and Convex Bodies; 3.2 Some Geometric Corollaries; 3.3 Approximation by Convex Semi-algebraic Sets; 4 Approximation of Convex Bodies by Polytopes; 4.1 Convex Bodies and Polytopes; 4.2 Fine Approximations; 4.3 Coarse Approximations; 4.4 Intermediate Approximations 5 The Polynomial Method5.1 Constructing Neighborly Polytopes; 5.2 Bounding the Constant in the Grothendieck Inequality; 5.3 Polynomial Ham Sandwich Theorem; 5.4 Equiangular Lines; 5.5 A Counterexample to Borsuk's Conjecture; References; Contact Numbers for Sphere Packings; 1 Introduction; 2 Motivation from Materials Science; 3 Largest Contact Numbers in the Plane; 3.1 The Euclidean Plane; 3.2 Spherical and Hyperbolic Planes; 4 Largest Contact Numbers in 3-Space; 5 Empirical Approaches; 5.1 Contact Number Estimates for up to 11 Spheres; 5.2 Maximal Contact Rigid Clusters 6 Digital and Totally Separable Sphere Packings for d=2, 37 On Largest Contact Numbers in Higher Dimensional Spaces; 7.1 Packings by Translates of a Convex Body; 7.2 Contact Graphs of Unit Sphere Packings in mathbbEd; 7.3 Digital and Totally Separable Sphere Packings in mathbbEd; 8 Contact Graphs of Non-congruent SphereIntro; Preface; Contents; The Tensorization Trick in Convex Geometry; 1 Introduction; 1.1 Tensor Power; 1.2 Tensor Powers and Polynomials; 1.3 Chebyshev Polynomials; 2 Packing Points in the Sphere; 2.1 Packing Points in the Sphere; 3 Approximating a Norm by a Polynomial and a Convex Body by an Algebraic Hypersurface; 3.1 Norms and Convex Bodies; 3.2 Some Geometric Corollaries; 3.3 Approximation by Convex Semi-algebraic Sets; 4 Approximation of Convex Bodies by Polytopes; 4.1 Convex Bodies and Polytopes; 4.2 Fine Approximations; 4.3 Coarse Approximations; 4.4 Intermediate Approximations 5 The Polynomial Method5.1 Constructing Neighborly Polytopes; 5.2 Bounding the Constant in the Grothendieck Inequality; 5.3 Polynomial Ham Sandwich Theorem; 5.4 Equiangular Lines; 5.5 A Counterexample to Borsuk's Conjecture; References; Contact Numbers for Sphere Packings; 1 Introduction; 2 Motivation from Materials Science; 3 Largest Contact Numbers in the Plane; 3.1 The Euclidean Plane; 3.2 Spherical and Hyperbolic Planes; 4 Largest Contact Numbers in 3-Space; 5 Empirical Approaches; 5.1 Contact Number Estimates for up to 11 Spheres; 5.2 Maximal Contact Rigid Clusters 6 Digital and Totally Separable Sphere Packings for d=2, 37 On Largest Contact Numbers in Higher Dimensional Spaces; 7.1 Packings by Translates of a Convex Body; 7.2 Contact Graphs of Unit Sphere Packings in mathbbEd; 7.3 Digital and Totally Separable Sphere Packings in mathbbEd; 8 Contact Graphs of Non-congruent Sphere Packings; References; The Topological Transversal Tverberg Theorem Plus Constraints; 1 Introduction; 2 Statement of the Main Results; 3 A Generalized Borsuk-Ulam Type Theorem and Two Lemmas; 3.1 Fadell-Husseini Index; 3.2 A Generalized Borsuk-Ulam Type Theorem 3.3 Two Lemmas4 Proofs; 4.1 Proof of the Topological Generalized Transversal Van Kampen-Flores Theorem; 4.2 Proof of the Topological Transversal Weak Colored Tverberg Theorem; References; On the Volume of Boolean Expressions of Balls -- A Review of the Kneser-Poulsen Conjecture; 1 Introduction; 2 First Results; 3 Unions and Intersections of Balls in Spaces of Constant Curvature; 4 Jumping into Higher Dimensions -- The Leapfrog Lemma; 5 Proof of the Kneser-Poulsen Conjecture in the Euclidean Plane; 6 Monotonicity of the Volume of Weighted Flowers 7 A Schläfli-Type Formula for Polytopes with Curved Faces7.1 Polytopes with Curved Faces in a Manifold and Their Variations; 7.2 Generalized Schläfli Formula in Einstein Manifolds; 8 Some Applications of the Generalized Schläfli Formula; 9 Application to a Problem of M. Kneser; 10 Alexander's Conjecture; 11 The Conjecture in More General Spaces; References; A Survey of Elekes-Rónyai-Type Problems; 1 The Elekes-Rónyai Problem; 1.1 Sums, Products, and Expanding Polynomials; 1.2 Extensions; 1.3 Applications; 1.4 About the Proof of Theorem1.1; 2 The Elekes-Szabó Problem … (more)
- Publisher Details:
- Berlin, Germany : Springer
- Publication Date:
- 2018
- Extent:
- 1 online resource
- Subjects:
- 516
Geometry
MATHEMATICS / Geometry / General
Geometry
Convex and Discrete Geometry
Combinatorics
Polytopes
Topology
Electronic books - Languages:
- English
- ISBNs:
- 9783662574133
3662574136 - Related ISBNs:
- 9783662574126
3662574128 - Notes:
- Note: Online resource; title from PDF title page (SpringerLink, viewed November 6, 2018).
- Access Rights:
- Legal Deposit; Only available on premises controlled by the deposit library and to one user at any one time; The Legal Deposit Libraries (Non-Print Works) Regulations (UK).
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- Restricted: Printing from this resource is governed by The Legal Deposit Libraries (Non-Print Works) Regulations (UK) and UK copyright law currently in force.
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- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library HMNTS - ELD.DS.402942
- Ingest File:
- 02_450.xml