Computational oriented matroids : equivalence classes of matrices within a natural framework

Bibliographic Information

Computational oriented matroids : equivalence classes of matrices within a natural framework

Jürgen G. Bokowski

Cambridge University Press, 2006

  • : hbk.

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Note

Includes bibliographical references (p. 314-321) and index

Description and Table of Contents

Description

Oriented matroids play the role of matrices in discrete geometry, when metrical properties, such as angles or distances, are neither required nor available. Thus they are of great use in such areas as graph theory, combinatorial optimization and convex geometry. The variety of applications corresponds to the variety of ways they can be defined. Each of these definitions corresponds to a differing data structure for an oriented matroid, and handling them requires computational support, best realised through a functional language. Haskell is used here, and, for the benefit of readers, the book includes a primer on it. The combination of concrete applications and computation, the profusion of illustrations, many in colour, and the large number of examples and exercises make this an ideal introductory text on the subject. It will also be valuable for self-study for mathematicians and computer scientists working in discrete and computational geometry.

Table of Contents

  • 1. Geometric matrix models i
  • 2. Geometric matrix models ii
  • 3. From matrices to rank 3 oriented matroids
  • 4. Oriented matroids of arbitrary rank
  • 5. From oriented matroids to face lattices
  • 6. From face lattices to oriented matroids i
  • 7. From face lattices to oriented matroids ii
  • 8. From oriented matroids to matrices
  • 9. Computational synthetic geometry
  • 10. Some oriented matroid applications
  • 11. Some inttrinsic oriented matroid problems
  • Bibliography
  • Index.

by "Nielsen BookData"

Details

  • NCID
    BA80145347
  • ISBN
    • 0521849306
  • LCCN
    2006295891
  • Country Code
    uk
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Place of Publication
    Cambridge, UK ; New York
  • Pages/Volumes
    xiii, 323 p.
  • Size
    26 cm
  • Classification
  • Subject Headings
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