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ABSTRACT
Given a polytope P, its secondary polytope has vertices corresponding to the regular tri-
angulations of P, and two triangulations are connected by an edge in the secondary polytope
if they di?er by a ?ip. We propose to study the secondary polytope of a class of polytopes
called ?ow polytopes.
Danilov, Karzanov and Koshevoy (DKK) have devised a method for constructing regular
unimodular triangulations of ?ow polytopes with unit ?ow. In some of our previous work,
we have shown that for a particular class of ?ow polytopes with Catalan volume, the DKK
triangulations have dual graphs which are Tamari lattices and lattices of subsets of the Type
A root posets.
No general method for constructing triangulations of ?ow polytopes with non-unit ?ow
is known. We are eager to develop theory along these lines, as there are classes of ?ow
polytopes with non-unit ?ow with combinatorially-interesting volumes (involving numbers
of parking functions), and it is of interest to study the triangulation space of these polytopes.
1
Status | Active |
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Effective start/end date | 9/1/22 → 8/31/27 |
Funding
- Simons Foundation
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Projects
- 1 Active