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Dense sequences of convex polytopes

Published online by Cambridge University Press:  26 February 2010

M. A. Perles
Affiliation:
Hebrew University of Jerusalem, Israel, andUniversity of East Anglia, Norwich, England.
G. C. Shephard
Affiliation:
Hebrew University of Jerusalem, Israel, andUniversity of East Anglia, Norwich, England.
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Let P be a d-dimensional convex polytope (briefly, a d-polytope) in d-dimensional euclidean space Ed. Associated with P is a vector f(P), known as the f-vector of P, defined by

where fj(P) is the number of j-faces of P for 0 ≤ jd − 1 and the superscript T denotes transposition. (We regard f(P) as a column vector, and identify it with the vector

where (e1, …, ed) is some fixed basis of Ed.) Let d be the set of all d-polytopes in Ed, and d be any subset of d. Using tghe notation of [1; §8.1], we donate by f(d) the set of vectors {f(P): P ε d}, and write aff f(d) for the (unique) affine subspace of lowest dimension in Ed which contains all the vectors of f(d). Then it is well-known that

the equation of the hyperplane aff f(d) being that given by the Euler relation between the numbers fj(P) [1; Theorem 8.1.1].

Type
Research Article
Copyright
Copyright © University College London 1970

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References

1.Grünbaum, B., Convex polytopes, (London–New York–Sydney, 1967).Google Scholar
2.Perles, M. A. and Shephard, G. C., “Facets and nonfacets of convex polytopes”, Acta Math., 119 (1967), 113145.CrossRefGoogle Scholar
3.Shephard, G. C., “Approximations by polytopes with projectively regular facets”, Mathematika, 13 (1966), 189195.CrossRefGoogle Scholar