Bousfield localization

Bousfield localization is a sophisticated version of the general idea of localization. We can localize a category by formally inverting certain morphisms: for example, when forming the homotopy category of a model category, where we invert morphisms called ‘weak equivalences’. But Bousfield localization is a subtler process. In the case of a model category, Bousfield localization allows us to *make more morphisms count as weak equivalences*. There is a related notion of Bousfield localization for triangulated categories.

Last revised on May 1, 2020 at 21:47:11. See the history of this page for a list of all contributions to it.