subfibrations

Subfibrations are a generalization of fibrations in the context of category theory, which was introduced by Peter May in the 1970s. A subfibration is a subobject of a fibration, where a subobject is a morphism from an object to its subobject. In the context of a fibration, a subfibration is a morphism with certain properties that are preserved by the pullback operation.

To be more specific, given a fibration p: E -> B with a subobject f: A -> E, we

The concept of subfibrations has important applications in various areas of mathematics, including homotopy theory, algebraic

One of the key properties of subfibrations is their behavior under composition and pullback operations. Subfibrations

Subfibrations have been studied extensively in the literature, and their properties and applications have been extensively