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Type: Article
Extensions of regular polytopes with preassigned Schläfli symbol
Abstract:
We say that a (d + 1)-polytope P is an extension of a polytope K if the facets or the vertex figures of P are isomorphic to K. The Schlafli symbol of any regular extension of a regular polytope is determined except for its first or last entry. For any regular polytope K we construct regular extensions with any even number as first entry of the Schlafli symbol. These extensions are lattices if K is a lattice. Moreover, using the so-called CPR graphs we provide a more general way of constructing extensions of polytopes.
We say that a (d + 1)-polytope P is an extension of a polytope K if the facets or the vertex figures of P are isomorphic to K. The Schlafli symbol of any regular extension of a regular polytope is determined except for its first or last entry. For any regular polytope K we construct regular extensions with any even number as first entry of the Schlafli symbol. These extensions are lattices if K is a lattice. Moreover, using the so-called CPR graphs we provide a more general way of constructing extensions of polytopes.
Keywords: Extensions; Abstract regular polytopes
MSC: 52B15 (51M20 52B11 52B20)
Journal: Journal of Combinatorial Theory Series A
ISSN: 0097-3165
Year: 2009
Volume: 116
Number: 2
Pages: 303--313
Created: 2012-12-11 18:35:58
Modified: 2014-02-12 16:14:30
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