anodinmuodot

Anodinmuodot (anodyne morphisms) are a concept in abstract homotopy theory and model category theory. In a model category, a morphism f: A → B is called anodinmuoto if it has the left lifting property with respect to every fibration. Equivalently, anodinmuodot are the maps that can be obtained from a generating set of morphisms by pushouts, compositions, and retracts; they form the left class in the standard two-class factorization together with fibrations and weak equivalences.

In many model structures, anodinmuodot are closely related to cofibrations and weak equivalences: they are often

Properties commonly cited for anodinmuodot include closure under pushouts, transfinite compositions, and retracts. They behave as

Origins and terminology: the concept arose with the development of Quillen’s model categories in the 1960s