Jack Hall, David Rydh
Published 2014-05-08, updated 2015-12-03Version 2
We develop a theory of unbounded derived categories of quasi-coherent sheaves on algebraic stacks. In particular, we show that these categories are compactly generated by perfect complexes for stacks that either have finite stabilizers or are local quotient stacks. We also extend To\"en and Antieau--Gepner's results on derived Azumaya algebras and compact generation of sheaves on linear categories from derived schemes to derived Deligne--Mumford stacks. These are all consequences of our main theorem: compact generation of a presheaf of triangulated categories on an algebraic stack is local for the quasi-finite flat topology.
Comments: reordering of the Introduction and sections 3 and 4; additional material on perfect complexes; Appendix A removed to be incorporated into another paper
The Balmer spectrum of a tame stack
One positive and two negative results for derived categories of algebraic stacks
Reconstructing the spectrum of F_1 from the stable homotopy category
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