The number of subsets of the positive roots that form a basis of the associated vector space.
For the group $W$ and an associated set of positive roots $\Phi^+ \subseteq V$ this counts the number of subsets $S \subseteq \Phi^+$ that form a basis of $V$.
This is also the number of subsets of the reflections $R \subseteq W$ that form a minimal set of generators of a reflection subgroup of full rank.
The Coxeter permutahedron can be defined as the Minkowski sum of the line segments $[- \frac{\alpha}{2}, \frac{\alpha}{2}]$ for $\alpha \in \Phi^+$. As a zonotope this polytope can be decomposed into a (disjoint) union of (half-open) parallel epipeds [1]. This also counts the number of full dimensional parallel epipeds among this decomposition.

[1] Shephard, G. C. Combinatorial properties of associated zonotopes MathSciNet:0362054 DOI:10.4153/CJM-1974-032-5

Dec 13, 2021 at 13:33 by Dennis Jahn

May 04, 2022 at 12:03 by Dennis Jahn