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We study the homotopy type of spaces of commuting elements in connected nilpotent Lie groups, via almost commuting elements in their Lie algebras. We give a necessary and sufficient condition on the fundamental group of such a Lie group G to ensure Hom (Zᵏ, G) is path-connected. In particular for the reduced upper unitriangular groups and the reduced generalized Heisenberg groups, Hom (Zᵏ, G) is not path-connected, and we compute the homotopy type of its path-connected components in terms of Stiefel manifolds and the maximal torus of G.
Camarena et al. (Wed,) studied this question.
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