Serre duality, Mukai pairing and universal Auslander--Reiten triangle

Abstract

We study the relationship between Serre duality and the Mukai pairing for smooth and proper dg-algebras. We introduce an alternative definition of the Mukai pairing and prove that it coincides with the Mukai pairings defined by Caldararu--Willerton and by Shklyarov. Our construction places both the Mukai pairing and Serre duality within a unified framework based on an elementary pairing between Hochschild homology and Hochschild cohomology. As a consequence, the adjointness of the boundary--bulk and bulk--boundary maps follows naturally. As an application, we investigate Auslander--Reiten theory for the perfect derived category of a non-positive smooth and proper dg-algebra. We construct an exact triangle of dg-A-A-bimodules, called a universal Auslander--Reiten triangle in the sense that the derived tensor product of this triangle with an indecomposable dg-A-module M yields an Auslander--Reiten triangle starting from M. In particular, this provides a functorial construction of Auslander--Reiten triangles. In the case of path algebras of quivers, our construction recovers the universal Auslander--Reiten triangle associated with quiver Heisenberg algebras.