Semi-derived Ringel-Hall algebras and Drinfeld double

Abstract

Let A be an arbitrary hereditary abelian category that may not have enough projective objects. For example, A can be the category of finite-dimensional representations of a quiver or the category of coherent sheaves on a smooth projective curve or on a weighted projective line. Inspired by the works of Bridgeland and Gorsky, we define the semi-derived Ringel-Hall algebra of A, denoted by SDHZ/2(A), to be the localization of a quotient algebra of the Ringel-Hall algebra of the category of Z/2-graded complexes over A. We obtain the following three main results. The semi-derived Ringel-Hall algebra has a natural basis. A twisted version of the semi-derived Ringel-Hall algebra of A is isomorphic to the Drinfeld double of the twisted extended Ringel-Hall algebra Htwe(A) of A. If A has a tilting object T, then its semi-derived Ringel-Hall algebra is isomorphic to the Z/2-graded semi-derived Hall algebra SDHZ/2(add T) of the exact category add T defined by Gorsky, and so is isomorphic to Bridgeland's Hall algebra of (End(T)op).