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arxiv: 1811.01673 · v1 · pith:D72MDAJJnew · submitted 2018-11-05 · 🧮 math.RT · math.CO

Gradedness of the set of rook placements in A_(n-1)

classification 🧮 math.RT math.CO
keywords rookplacementsrootsystemorderplacementalgebraicassign
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A rook placement is a subset of a root system consisting of positive roots with pairwise non-positive inner products. To each rook placement in a root system one can assign the coadjoint orbit of the Borel subgroup of a reductive algebraic group with this root system. Degenerations of such orbits induce a natural partial order on the set of rook placements. We study combinatorial structure of the set of rook placements in $A_{n-1}$ with respect to a slightly different order and prove that this poset is graded.

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