arXiv:math/9701207 Abstract

arXiv:math/9701207 [math.CO]Abstract References Reviews Resources

Piles of Cubes, Monotone Path Polytopes and Hyperplane Arrangements

Published 1997-01-02Version 1

Monotone path polytopes arise as a special case of the construction of fiber polytopes, introduced by Billera and Sturmfels. A simple example is provided by the permutahedron, which is a monotone path polytope of the standard unit cube. The permutahedron is the zonotope polar to the braid arrangement. We show how the zonotopes polar to the cones of certain deformations of the braid arrangement can be realized as monotone path polytopes. The construction is an extension of that of the permutahedron and yields interesting connections between enumerative combinatorics of hyperplane arrangements and geometry of monotone path polytopes.

Categories: math.CO

Keywords: hyperplane arrangements, braid arrangement, monotone path polytopes arise, permutahedron, standard unit cube

Related articles: Most relevant | Search more

arXiv:1305.1752 [math.CO] (Published 2013-05-08)

Relation spaces of hyperplane arrangements and modules defined by graphs of fiber zonotopes

Tobias Finis, Erez Lapid

arXiv:2412.02584 [math.CO] (Published 2024-12-03)

Facet-Hamiltonian cycles in the $B$-permutahedron

Nastaran Behrooznia, Sofia Brenner, Arturo Merino, Torsten Mütze, Christian Rieck, Francesco Verciani

arXiv:2010.00930 [math.CO] (Published 2020-10-02)

The Bernardi formula for non-transitive deformations of the braid arrangement

Ankit Bisain, Eric J. Hanson