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ISBN: 100925779X 1009257781 Year: 2024 Publisher: Cambridge, United Kingdom ; New York, NY : Cambridge University Press,
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This book introduces convex polytopes and their graphs, alongside the results and methodologies required to study them. It guides the reader from the basics to current research, presenting many open problems to facilitate the transition. The book includes results not previously found in other books, such as: the edge connectivity and linkedness of graphs of polytopes; the characterisation of their cycle space; the Minkowski decomposition of polytopes from the perspective of geometric graphs; Lei Xue's recent lower bound theorem on the number of faces of polytopes with a small number of vertices; and Gil Kalai's rigidity proof of the lower bound theorem for simplicial polytopes. This accessible introduction covers prerequisites from linear algebra, graph theory, and polytope theory. Each chapter concludes with exercises of varying difficulty, designed to help the reader engage with new concepts. These features make the book ideal for students and researchers new to the field.
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Year: 1967 Publisher: London: New York [etc.]: Interscience,
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Year: 1967 Publisher: London : Interscience Publishers,
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ISBN: 1009257773 9781009257770 1009257811 9781009257817 9781009257794 Year: 2024 Publisher: Cambridge, United Kingdom ; New York, NY Cambridge University Press
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"This book introduces convex polytopes and their graphs, alongside the results and methodology required to study them. Including background material, open problems, and cutting-edge research, this is the ideal book for readers new to the area."--
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Year: 1967 Publisher: London Interscience
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ISBN: 9780817637705 0817637702 Year: 1994 Publisher: Boston (Mass.): Birkhäuser,
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Year: 1967 Volume: 16 Publisher: London,New York : Interscience publishers, Division of John Wiley and sons,
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ISBN: 1875399046 Year: 1992 Publisher: Glebe Carslaw Publications
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ISBN: 0521277396 9780521277396 Year: 1984 Volume: 90 Publisher: Cambridge ; New York, NY : Cambridge University Press,
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Convex polytopes --- Symmetry --- Polytopes convexes --- Symétrie --- Symétrie --- Geometrie --- Polyedres
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Year: 1967 Publisher: London : Interscience,
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Geometry --- Convex polytopes --- Géométrie --- Polytopes convexes --- Géométrie
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