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Author: Jürgen Richter-Gebert Publisher: Springer ISBN: 3540496408 Category : Mathematics Languages : en Pages : 195
Book Description
The book collects results about realization spaces of polytopes. It gives a presentation of the author's "Universality Theorem for 4-polytopes". It is a comprehensive survey of the important results that have been obtained in that direction. The approaches chosen are direct and very geometric in nature. The book is addressed to researchers and to graduate students. The former will find a comprehensive source for the above mentioned results. The latter will find a readable introduction to the field. The reader is assumed to be familiar with basic concepts of linear algebra.
Author: Jürgen Richter-Gebert Publisher: Springer ISBN: 3540496408 Category : Mathematics Languages : en Pages : 195
Book Description
The book collects results about realization spaces of polytopes. It gives a presentation of the author's "Universality Theorem for 4-polytopes". It is a comprehensive survey of the important results that have been obtained in that direction. The approaches chosen are direct and very geometric in nature. The book is addressed to researchers and to graduate students. The former will find a comprehensive source for the above mentioned results. The latter will find a readable introduction to the field. The reader is assumed to be familiar with basic concepts of linear algebra.
Author: Amy Wiebe Publisher: ISBN: Category : Languages : en Pages : 142
Book Description
Chapter 1 describes several models for the realization space of a polytope. These models include the classical model, a model representing realizations in the Grassmannian, a new model which represents realizations by slack matrices, and a model which represents polytopes by their Gale transforms. We explore the connections between these models, and show how they can be exploited to obtain useful parametrizations of the slack realization space. Chapter 2 introduces a natural model for the realization space of a polytope up to projective equivalence which we call the slack realization space of the polytope. The model arises from the positive part of an algebraic variety determined by the slack ideal of the polytope. This is a saturated determinantal ideal that encodes the combinatorics of the polytope. The slack ideal offers an effective computational framework for several classical questions about polytopes such as rational realizability, non-prescribability of faces, and realizability of combinatorial polytopes. Chapter 3 studies the simplest possible slack ideals, which are toric, and explores their connections to projectively unique polytopes. We prove that if a projectively unique polytope has a toric slack ideal, then it is the toric ideal of the bipartite graph of vertex-facet non- incidences of the polytope. The slack ideal of a polytope is contained in this toric ideal if and only if the polytope is morally 2-level, a generalization of the 2-level property in polytopes. We show that polytopes that do not admit rational realizations cannot have toric slack ideals. A classical example of a projectively unique polytope with no rational realizations is due to Perles. We prove that the slack ideal of the Perles polytope is reducible, providing the first example of a slack ideal that is not prime. Chapter 4 studies a certain collection of polytopal operations which preserve projective uniqueness of polytopes. We look at their effect on slack matrices and use this to classify all "McMullen-type" projectively unique polytopes in dimension 5. From this we identify one of the smallest known projectively unique polytopes not obtainable from McMullen's constructions. Chapter 5 extends the slack realization space model to the setting of matroids. We show how to use this model to certify non-realizability of matroids, and describe an explicit relationship to the standard Grassmann-Plücker realization space model. We also exhibit a way of detecting projectively unique matroids via their slack ideals by introducing a toric ideal that can be associated to any matroid. Chapter 6 addresses some of the computational aspects of working with slack ideals. We develop a Macaulay2 [27] package for computing and manipulating slack ideals. In particular, we explore the dehomogenizing and rehomogenizing of slack ideals, both from a computational and theoretical perspective.
Author: Tibor Bisztriczky Publisher: Springer Science & Business Media ISBN: 9401109249 Category : Mathematics Languages : en Pages : 515
Book Description
The aim of this volume is to reinforce the interaction between the three main branches (abstract, convex and computational) of the theory of polytopes. The articles include contributions from many of the leading experts in the field, and their topics of concern are expositions of recent results and in-depth analyses of the development (past and future) of the subject. The subject matter of the book ranges from algorithms for assignment and transportation problems to the introduction of a geometric theory of polyhedra which need not be convex. With polytopes as the main topic of interest, there are articles on realizations, classifications, Eulerian posets, polyhedral subdivisions, generalized stress, the Brunn--Minkowski theory, asymptotic approximations and the computation of volumes and mixed volumes. For researchers in applied and computational convexity, convex geometry and discrete geometry at the graduate and postgraduate levels.
Author: Zhizhin, Gennadiy Vladimirovich Publisher: IGI Global ISBN: 1522569693 Category : Technology & Engineering Languages : en Pages : 301
Book Description
The majority of the chemical elements form chemical compounds with molecules of higher dimension (i.e., substantially exceeding three). This fact is very important for the analysis of molecular interactions in various areas: nanomedicine, nanotoxicology, and quantum biology. The Geometry of Higher-Dimensional Polytopes contains innovative research on the methods and applications of the structures of binary compounds. It explores the study of geometry polytopes from a higher-dimensional perspective, taking into account the features of polytopes that are models of chemical compounds. While highlighting topics including chemical compounds, symmetry transformation, and DNA structures, this book is ideally designed for researchers, academicians, and students seeking current research on dimensions present in binary compounds.
Author: Günter M. Ziegler Publisher: Springer ISBN: 9780387943657 Category : Mathematics Languages : en Pages : 388
Book Description
Based on a graduate course at the Technische Universität, Berlin, these lectures present a wealth of material on the modern theory of convex polytopes. The straightforward exposition features many illustrations, and complete proofs for most theorems. With only linear algebra as a prerequisite, it takes the reader quickly from the basics to topics of recent research. The lectures introduce basic facts about polytopes, with an emphasis on methods that yield the results, discuss important examples and elegant constructions, and show the excitement of current work in the field. They will provide interesting and enjoyable reading for researchers as well as students.
Author: Günter M. Ziegler Publisher: Springer Science & Business Media ISBN: 038794365X Category : Mathematics Languages : en Pages : 388
Book Description
Based on a graduate course at the Technische Universität, Berlin, these lectures present a wealth of material on the modern theory of convex polytopes. The straightforward exposition features many illustrations, and complete proofs for most theorems. With only linear algebra as a prerequisite, it takes the reader quickly from the basics to topics of recent research. The lectures introduce basic facts about polytopes, with an emphasis on methods that yield the results, discuss important examples and elegant constructions, and show the excitement of current work in the field. They will provide interesting and enjoyable reading for researchers as well as students.
Author: Peter McMullen Publisher: Cambridge University Press ISBN: 1108788319 Category : Mathematics Languages : en Pages : 617
Book Description
Regular polytopes and their symmetry have a long history stretching back two and a half millennia, to the classical regular polygons and polyhedra. Much of modern research focuses on abstract regular polytopes, but significant recent developments have been made on the geometric side, including the exploration of new topics such as realizations and rigidity, which offer a different way of understanding the geometric and combinatorial symmetry of polytopes. This is the first comprehensive account of the modern geometric theory, and includes a wide range of applications, along with new techniques. While the author explores the subject in depth, his elementary approach to traditional areas such as finite reflexion groups makes this book suitable for beginning graduate students as well as more experienced researchers.
Author: Jürgen Richter-Gebert
Author: Jürgen Richter-Gebert
Author: Amy Wiebe
Author: J. Richter-Gebert
Author: Jürgen Richter-Gebert
Author: Laith Rastanawi
Author: Tibor Bisztriczky
Author: Zhizhin, Gennadiy Vladimirovich
Author: Günter M. Ziegler
Author: Günter M. Ziegler
Author: Peter McMullen