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The cube :a window to convex and discrete geometry /

Record Type:	Language materials, printed : Monograph/item
[NT 15000414]:	516.08
Title/Author:	The cube : : a window to convex and discrete geometry // Chuanming Zong.
remainder title:	The Cube-A Window to Convex & Discrete Geometry
Author:	Zong, Chuanming,
Description:	1 online resource (x, 174 pages) : : digital, PDF file(s).
Notes:	Title from publisher's bibliographic system (viewed on 05 Oct 2015).
Subject:	Convex geometry.
Subject:	Discrete geometry.
ISBN:	9780511543173 (ebook)
[NT 15000228]:	Basic notation -- Cross sections -- Projections -- Inscribed simplices -- Triangulations -- 0/1 polytopes -- Minkowski's conjecture -- Furtwangler's conjecture -- Keller's conjecture.
[NT 15000229]:	This tract has two purposes: to show what is known about the n-dimensional unit cubes and to demonstrate how Analysis, Algebra, Combinatorics, Graph Theory, Hyperbolic Geometry, Number Theory, can be applied to the study of them. The unit cubes, from any point of view, are among the most important and fascinating objects in an n-dimensional Euclidean space. However, our knowledge about them is still quite limited and many basic problems remain unsolved. In this Tract eight topics about the unit cubes are introduced: cross sections, projections, inscribed simplices, triangulations, 0/1 polytopes, Minkowski's conjecture, Furtwangler's conjecture, and Keller's conjecture. In particular the author demonstrates how deep analysis like log concave measure and the Brascamp-Lieb inequality can deal with the cross section problem, how Hyperbolic Geometry helps with the triangulation problem, how group rings can deal with Minkowski's conjecture and Furtwangler's conjecture, and how Graph Theory handles Keller's conjecture.
Online resource:	http://dx.doi.org/10.1017/CBO9780511543173

The cube :a window to convex and discrete geometry /
Zong, Chuanming,

The cube :a window to convex and discrete geometry /The Cube-A Window to Convex & Discrete GeometryChuanming Zong. - 1 online resource (x, 174 pages) :digital, PDF file(s). - Cambridge tracts in mathematics ;168. - Cambridge tracts in mathematics ;169..

Title from publisher's bibliographic system (viewed on 05 Oct 2015).

Basic notation -- Cross sections -- Projections -- Inscribed simplices -- Triangulations -- 0/1 polytopes -- Minkowski's conjecture -- Furtwangler's conjecture -- Keller's conjecture.

This tract has two purposes: to show what is known about the n-dimensional unit cubes and to demonstrate how Analysis, Algebra, Combinatorics, Graph Theory, Hyperbolic Geometry, Number Theory, can be applied to the study of them. The unit cubes, from any point of view, are among the most important and fascinating objects in an n-dimensional Euclidean space. However, our knowledge about them is still quite limited and many basic problems remain unsolved. In this Tract eight topics about the unit cubes are introduced: cross sections, projections, inscribed simplices, triangulations, 0/1 polytopes, Minkowski's conjecture, Furtwangler's conjecture, and Keller's conjecture. In particular the author demonstrates how deep analysis like log concave measure and the Brascamp-Lieb inequality can deal with the cross section problem, how Hyperbolic Geometry helps with the triangulation problem, how group rings can deal with Minkowski's conjecture and Furtwangler's conjecture, and how Graph Theory handles Keller's conjecture.

ISBN: 9780511543173 (ebook)Subjects--Topical Terms:

567098
Convex geometry.

LC Class. No.: QA639.5 / .Z64 2006

Dewey Class. No.: 516.08

The cube :a window to convex and discrete geometry /
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490 1 $a Cambridge tracts in mathematics ; $v 168
500 $a Title from publisher's bibliographic system (viewed on 05 Oct 2015).
505 0 $a Basic notation -- Cross sections -- Projections -- Inscribed simplices -- Triangulations -- 0/1 polytopes -- Minkowski's conjecture -- Furtwangler's conjecture -- Keller's conjecture.
520 $a This tract has two purposes: to show what is known about the n-dimensional unit cubes and to demonstrate how Analysis, Algebra, Combinatorics, Graph Theory, Hyperbolic Geometry, Number Theory, can be applied to the study of them. The unit cubes, from any point of view, are among the most important and fascinating objects in an n-dimensional Euclidean space. However, our knowledge about them is still quite limited and many basic problems remain unsolved. In this Tract eight topics about the unit cubes are introduced: cross sections, projections, inscribed simplices, triangulations, 0/1 polytopes, Minkowski's conjecture, Furtwangler's conjecture, and Keller's conjecture. In particular the author demonstrates how deep analysis like log concave measure and the Brascamp-Lieb inequality can deal with the cross section problem, how Hyperbolic Geometry helps with the triangulation problem, how group rings can deal with Minkowski's conjecture and Furtwangler's conjecture, and how Graph Theory handles Keller's conjecture.
650 0 $a Convex geometry. $3 567098
650 0 $a Discrete geometry. $3 635582
776 0 8 $i Print version: $z 9780521855358
830 0 $a Cambridge tracts in mathematics ; $v 169. $3 642585
856 4 0 $u http://dx.doi.org/10.1017/CBO9780511543173