Thomason cohomology and Quillen's Theorem A
Abstract
Given a functor : C D between two small categories, there is a homotopy equivalence : hocolim D N( /-) NC where N(/-) is the functor which sends every object d in D to the nerve of the comma category /d. We prove that the homotopy equivalence induces an isomorphism on cohomology with coefficients in any coefficient system. As a consequence, we obtain a version of Quillen's Theorem A for the Thomason cohomology of categories. We also construct a spectral sequence for the Thomason cohomology of the Grothendieck construction ∫ D F of a functor F: D Cat using the isomorphism in the main theorem.
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