Authors: Petrić, Zoran 
Title: On stretching the interval simplex-permutohedron
Journal: Journal of Algebraic Combinatorics
Volume: 39
Issue: 1
First page: 99
Last page: 125
Issue Date: 1-Feb-2014
Rank: M21
ISSN: 0925-9899
DOI: 10.1007/s10801-013-0440-2
Abstract: 
A family of polytopes introduced by E.M. Feichtner, A. Postnikov, and B. Sturmfels, which were named nestohedra, consists in each dimension of an interval of polytopes starting with a simplex and ending with a permutohedron. This paper investigates a problem of changing and extending the boundaries of these intervals. An iterative application of Feichtner-Kozlov procedure of forming complexes of nested sets is a solution of this problem. By using a simple algebraic presentation of members of nested sets it is possible to avoid the problem of increasing the complexity of the structure of nested curly braces in elements of the produced simplicial complexes.
Keywords: Associahedron | Building set | Combinatorial blowup | Cyclohedron | Hypergraph | Nested set | Permutohedron | Simple polytope | Simplex | Stellar subdivision | Truncation
Publisher: Springer Link
Project: Representations of logical structures and formal languages and their application in computing 

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