Drinfeld-Lau Descent over Fibered Categories

Abstract

Let X be a category fibered in groupoids over a finite field Fq, and let k be an algebraically closed field containing Fq. Denote by φk Xk Xk the arithmetic Frobenius of Xk/k and suppose that M is a stack over Fq (not necessarily in groupoids). Then there is a natural functor α M, X M( X) M( Dk( X)), where M( Dk( X)) is the category of φk-invariant maps Xk M. A version of Drinfeld's lemma states that if X is a projective scheme and M is the stack of quasi-coherent sheaves of finite presentation, then α M, X is an equivalence. We extend this result in several directions. For proper algebraic stacks or affine gerbes X, we prove Drinfeld's lemma and deduce that α M, X is an equivalence for very general algebraic stacks M. For arbitrary X, we show that α M, X is an equivalence when M is the stack of immersions, the stack of quasi-compact separated \'etale morphisms or any quasi-separated Deligne-Mumford stack with separated diagonal.