A canonical realization of the alt ν-associahedron is given via areas below lattice paths and a tropical hyperplane arrangement, generalizing prior ν-associahedra and recovering Loday's realization by affine transformation.
Cesar and Cl´ ement Chenevi` ere
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
fields
math.CO 2verdicts
UNVERDICTED 2representative citing papers
Introduces the skeletal poset SK(L) induced by unit-height covers and altitude lattices for distributive lattices that generalize alt-Tamari lattices while preserving the number of linear intervals across a family.
citing papers explorer
-
A canonical realization of the alt $\nu$-associahedron
A canonical realization of the alt ν-associahedron is given via areas below lattice paths and a tropical hyperplane arrangement, generalizing prior ν-associahedra and recovering Loday's realization by affine transformation.
-
On some posets and lattices with the same height
Introduces the skeletal poset SK(L) induced by unit-height covers and altitude lattices for distributive lattices that generalize alt-Tamari lattices while preserving the number of linear intervals across a family.