The étale local structure of algebraic stacks (1912.06162v3)

Abstract: We prove that an algebraic stack with affine stabilizers over an arbitrary (possibly mixed-characteristic) base is \'etale locally a quotient stack around any point with a linearly reductive stabilizer. This generalizes earlier work by the authors (stacks over algebraically closed fields) and by Abramovich, Olsson and Vistoli (stacks with finite inertia). In addition, we prove a number of foundational results, which are new even over a field. We expect these results to be as consequential to the study of algebraic stacks as our local structure theorems. They include various coherent completeness and effectivity results for adic sequences of algebraic stacks. Finally, we give several applications of our results and methods, such as structure theorems for linearly reductive group schemes and generalizations to the relative setting of Sumihiro's theorem on torus actions and Luna's \'etale slice theorem.