The geometry of conjugation in affine Coxeter groups
Abstract
We develop new and precise geometric descriptions of the conjugacy class [x] and coconjugation set C(x,x') = \ y ∈ W yxy-1 = x' \ for all elements x,x' of any affine Coxeter group W. The centralizer of x in W is the special case C(x,x). The key structure in our description of the conjugacy class [x] is the mod-set ModW(w) = (w-I)R, where~w is the finite part of x and R is the coroot lattice. The coconjugation set C(x,x') is then described by ModW(w') together with the fix-set of w', where w' is the finite part of x'. For any element w of the associated finite Weyl group W, the mod-set of w is contained in the classical move-set Mov(w) = Im(w - I). We prove that the rank of ModW(w) equals the dimension of Mov(w), and then further investigate type-by-type the surprisingly subtle structure of the Z-module ModW(w). As corollaries, we determine exactly when ModW(w) = Mov(w) R, in which case our closed-form descriptions of conjugacy classes and coconjugation sets are as simple as possible.
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