Geometric combinatorics
著者
書誌事項
Geometric combinatorics
(IAS/Park City mathematics series / [Dan Freed, series editor], v. 13)
American Mathematical Society , Institute for Advanced Study, c2007
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注記
Includes bibliographical references (p. 687-691)
内容説明・目次
内容説明
Geometric combinatorics describes a wide area of mathematics that is primarily the study of geometric objects and their combinatorial structure. Perhaps the most familiar examples are polytopes and simplicial complexes, but the subject is much broader. This volume is a compilation of expository articles at the interface between combinatorics and geometry, based on a three-week program of lectures at the Institute for Advanced Study/Park City Math Institute (IAS/PCMI) summer program on Geometric Combinatorics.
The topics covered include posets, graphs, hyperplane arrangements, discrete Morse theory, and more. These objects are considered from multiple perspectives, such as in enumerative or topological contexts, or in the presence of discrete or continuous group actions. Most of the exposition is aimed at graduate students or researchers learning the material for the first time. Many of the articles include substantial numbers of exercises, and all include numerous examples. The reader is led quickly to the state of the art and current active research by worldwide authorities on their respective subjects.
Information for our distributors: Titles in this series are co-published with the Institute for Advanced Study/Park City Mathematics Institute. Members of the Mathematical Association of America (MAA) and the National Council of Teachers of Mathematics (NCTM) receive a 20% discount from list price.
目次
- What is geometric combinatorics?-An overview of the graduate summer school Bibliography A. Barvinok, Lattice points, polyhedra, and complexity: Introduction Inspirational examples. Valuations Identities in the algebra of polyhedra Generating functions and cones. Continued fractions Rational polyhedra and rational functions Computing generating functions fast Bibliography S. Fomin and N. Reading, Root systems and generalized associahedra: Introduction Reflections and roots Dynkin diagrams and Coxeter groups Associahedra and mutations Cluster algebras Enumerative problems Bibliography R. Forman, Topics in combinatorial differential topology and geometry: Introduction Discrete Morse theory Discrete Morse theory, continued Discrete Morse theory and evasiveness The Charney-Davis conjectures From analysis to combinatorics Bibliography M. Haiman and A. Woo, Geometry of $q$ and $q,t$-analogs in combinatorial enumeration: Introduction Kostka numbers and $q$-analogs Catalan numbers, trees, Lagrange inversion, and their $q$-analogs Macdonald polynomials Connecting Macdonald polynomials and $q$-Lagrange inversion
- $(q,t)$-analogs Positivity and combinatorics? Bibliography D. N. Kozlov, Chromatic numbers, morphism complexes, and Stiefel-Whitney characteristic classes: Preamble Introduction The functor Hom$(-,-)$ Stiefel-Whitney classes and first applications The spectral sequence approach The proof of the Lovasz conjecture Summary and outlook Bibliography R. MacPherson, Equivariant invariants and linear geometry: Introduction Equivariant homology and intersection homology (Geometry of pseudomanifolds) Moment graphs (Geometry of orbits) The cohomology of a linear graph (Polynomial and linear geometry) Computing intersection homology (Polynomial and linear geometry II) Cohomology as functions on a variety (Geometry of subspace arrangements) Bibliography R. P. Stanley, An introduction to hyperplane arrangements: Basic definitions, the intersection poset and the characteristic polynomial Properties of the intersection poset and graphical arrangements Matroids and geometric lattices Broken circuits, modular elements, and supersolvability Finite fields Separating hyperplanes Bibliography M. L. Wachs, Poset topology: Tools and applications: Introduction Basic definitions, results, and examples Group actions on posets Shellability and edge labelings Recursive techniques Poset operations and maps Bibliography G. M. Ziegler, Convex polytopes: Extremal constructions and $f$-vector shapes: Introduction Constructing 3-dimensional polytopes Shapes of $f$-vectors 2-simple 2-simplicial 4-polytopes $f$-vectors of 4-polytopes Projected products of polygons A short introduction to polymake Bibliography.
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