Homotopy nilpotent groups and their associated functors
classification
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keywords
homotopyprovespacesassociateassociatedauthorcolimitscommutes
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To every homotopy n-nilpotent group, defined in earlier work by Dwyer and the author, we associate an endofunctor of pointed spaces and prove that it is looped and n-excisive. As a tool we prove that $\Omega P_n({\rm id})$ commutes with sifted colimits of connected spaces.
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