ShopSpell

Euclidean Shortest Paths Exact or Approximate Algorithms [Hardcover]

$126.99     $179.99    29% Off      (Free Shipping)
100 available
  • Category: Books (Computers)
  • Author:  Li, Fajie, Klette, Reinhard
  • Author:  Li, Fajie, Klette, Reinhard
  • ISBN-10:  1447122550
  • ISBN-10:  1447122550
  • ISBN-13:  9781447122555
  • ISBN-13:  9781447122555
  • Publisher:  Springer
  • Publisher:  Springer
  • Pages:  384
  • Pages:  384
  • Binding:  Hardcover
  • Binding:  Hardcover
  • Pub Date:  01-Mar-2011
  • Pub Date:  01-Mar-2011
  • SKU:  1447122550-11-SPRI
  • SKU:  1447122550-11-SPRI
  • Item ID: 100478936
  • List Price: $179.99
  • Seller: ShopSpell
  • Ships in: 5 business days
  • Transit time: Up to 5 business days
  • Delivery by: Jul 10 to Jul 12
  • Notes: Brand New Book. Order Now.
This unique text/reference reviews algorithms for the exact or approximate solution of shortest-path problems, with a specific focus on a class of algorithms called rubberband algorithms. Discussing each concept and algorithm in depth, the book includes mathematical proofs for many of the given statements. Topics and features: provides theoretical and programming exercises at the end of each chapter; presents a thorough introduction to shortest paths in Euclidean geometry, and the class of algorithms called rubberband algorithms; discusses algorithms for calculating exact or approximate ESPs in the plane; examines the shortest paths on 3D surfaces, in simple polyhedrons and in cube-curves; describes the application of rubberband algorithms for solving art gallery problems, including the safari, zookeeper, watchman, and touring polygons route problems; includes lists of symbols and abbreviations, in addition to other appendices.This book reviews algorithms for the exact or approximate solution of shortest-path problems, with a specific focus on a class of algorithms called rubberband algorithms. The coverage includes mathematical proofs for many of the given statements.

The Euclidean shortest path (ESP) problem asks the question: what is the path of minimum length connecting two points in a 2- or 3-dimensional space? Variants of this industrially-significant computational geometry problem also require the path to pass through specified areas and avoid defined obstacles.

This unique text/reference reviews algorithms for the exact or approximate solution of shortest-path problems, with a specific focus on a class of algorithms called rubberband algorithms. Discussing each concept and algorithm in depth, the book includes mathematical proofs for many of the given statements. Suitable for a second- or third-year university algorithms course, the text enables readers to understand not only the algorithms and their pseudocodes, but also the correclÓh

Add Review