Goodwillie calculus – approximation of homotopy theories by stable homotopy theories
In the context of Goodwillie calculus, an (∞,1)-functor is called -reduced for , , if its (n-1)-excisive approximation is trivial, (hence if it is a anti-modal type).
(e.g. Lurie, def. 6.1.2.1)
Hence a functor is 1-reduced (or just reduced, for short), if .
A functor that is both n-excisive and -reduced is called an n-homogeneous (∞,1)-functor.
Created on January 6, 2016 at 14:46:48. See the history of this page for a list of all contributions to it.