The geometry of conjugation in Euclidean isometry groups
Abstract
We describe the geometry of conjugation within any split subgroup H of the full isometry group G of n-dimensional Euclidean space. We prove that for any h ∈ H, the conjugacy class [h]H of h is described geometrically by the move-set of its linearization, while the set of elements conjugating h to a given h'∈ [h]H is described by the the fix-set of its linearization. Examples include all affine Coxeter groups, certain crystallographic groups, and the group G itself.
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