The Q-shaped derived category of a ring -- compact and perfect objects

Abstract

In a previous work we constructed the Q-shaped derived category of any ring A for any suitably nice category Q. The Q-shaped derived category of A, which is denoted by DQ(A), is a generalization of the ordinary derived category. In this paper we prove that the Q-shaped derived category of A is a compactly generated triangulated category. We also define perfect objects in DQ(A) and prove that these constitute a triangulated subcategory, DperfQ(A), of the category DQ(A)c of compact objects in the Q-shaped derived category. The subcategories DperfQ(A) and DQ(A)c coincide if and only if the former is thick.