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How many objects of a given shape and size can be packed into a large box of fixed volume? Can one plant n trees in an orchard, not all along the same line, so that every line determined by two trees will pass through a third? These questions, raised by Hilbert and Sylvester roughly one hundred years ago, have generated a lot of interest among professional and amateur mathematicians and scientists.
They have led to the birth of a new mathematical discipline with close ties to classical geometry and number theory, and with many applications in coding theory, potential theory, computational geometry, computer graphics, robotics, etc. Combinatorial Geometry offers a self-contained introduction to this rapidly developing field, where combinatorial and probabilistic (counting) methods play a crucial role.
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Combinatorial geometry, GeometryShowing 1 featured edition. View all 1 editions?
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Includes bibliographical references (p. 319-341) and indexes.
"A Wiley-Interscience publication."
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- Created April 1, 2008
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July 18, 2024 | Edited by MARC Bot | import existing book |
September 30, 2022 | Edited by Tom Morris | merge authors |
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November 18, 2020 | Edited by MARC Bot | import existing book |
April 1, 2008 | Created by an anonymous user | Imported from Scriblio MARC record |