Tannaka duality for enhanced triangulated categories I: reconstruction

Abstract

We develop Tannaka duality theory for dg categories. To any dg functor from a dg category A to finite-dimensional complexes, we associate a dg coalgebra C via a Hochschild homology construction. When the dg functor is faithful, this gives a quasi-equivalence between the derived dg categories of A-modules and of C-comodules. When A is Morita fibrant (i.e. an idempotent-complete pre-triangulated category), it is thus quasi-equivalent to the derived dg category of compact C-comodules. We give several applications for motivic Galois groups.