Gabriel Kerr, Sophia Palcic
Published 2023-08-14Version 1
We define the notion of a painted tropical $A$-complex and describe a poset structure on the set of all such complexes. This poset is equivalent to the face lattice of a secondary polytope $\Sigma (\bar{A}_\alpha )$ where $\bar{A}_\alpha$ is built from $A$ and an additional point $\alpha$. As a central application, we show that multiplihedra are also secondary polytopes.
Comments: 18 pages, 8 figures
On the Facets of the Secondary Polytope
A poset structure on quasifibonacci partitions
A Poset Structure on the Alternating Group Generated by 3-Cycles
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