Quillen's theorems A and B

Template:Short description In topology, a branch of mathematics, Quillen's Theorem A gives a sufficient condition for the classifying spaces of two categories to be homotopy equivalent. Quillen's Theorem B gives a sufficient condition for a square consisting of classifying spaces of categories to be homotopy Cartesian. The two theorems play central roles in Quillen's Q-construction in algebraic K-theory and are named after Daniel Quillen.

The precise statements of the theorems are as follows.^[1]

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In general, the homotopy fiber of ${\displaystyle Bf:BC\to BD}$ is not naturally the classifying space of a category: there is no natural category ${\displaystyle Ff}$ such that ${\displaystyle FBf=BFf}$. Theorem B constructs ${\displaystyle Ff}$ in a case when ${\displaystyle f}$ is especially nice.

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