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Home > Vol 6, No 4 (1997)

Patrick Headley

Let k Ĩ Z k \in Z , let H( a, k) H(α,k) be the hyperplane { v Ĩ V: á a, v ñ = k} \{ v \in V:\left\langle {α,v} \right\rangle = k\} . We define a set of hyperplanes H = { H( d,1): d Ĩ F ⁺ } È{ H( d,0): d Ĩ F ⁺ } \mathcal{H} = \{ H(δ,1):δ\in Φ^ + \} \cup \{ H(δ,0):δ\in Φ^ + \} . This hyperplane arrangement is significant inthe study of the affine Weyl groups. In this paper it is shown that thePoincaré polynomial of H \mathcal{H} is ( 1 + ht ) ⁿ \left( {1 + ht} \right)^n , where n is the rank of and h is the Coxeter number of the finiteCoxeter group corresponding to .

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