Titlebook: An Introduction to Convex Polytopes; Arne Br?ndsted Textbook 1983 Springer Science+Business Media New York 1983 Equivalence.Konvexes Polyt

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Combinatorial Theory of Convex Polytopes,At the beginning of Section 10 it was indicated that the combinatorial theory of convex polytopes may be described as the study of their face-lattices. When it comes to reality, however, this description is too ambitious. Instead, we shall describe the combinatorial theory as the study of .-vectors.

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Humor — Eine Ann?herung an ein Ph?nomenrk for studying convex sets is the notion of a Euclidean space, i.e. a finite-dimensional real affine space whose underlying linear space is equipped with an inner product. However, there is no essential loss of generality in working only with the more concrete spaces ?.; therefore, everything will

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