Realizing stable categories as derived categories

In this paper, we discuss a relationship between representation theory of graded self-injective algebras and that of algebras of finite global dimension. For a positively graded self-injective algebra $A$ such that $A_0$ has finite global dimension, we construct two types of triangle-equivalences. First we show that there exists a triangle-equivalence between the stable category of $\mathbb{Z}$-graded $A$-modules and the derived category of a certain algebra $\Gamma$ of finite global dimension. Secondly we show that if $A$ has Gorenstein parameter $\ell$, then there exists a triangle-equivalence between the stable category of $\mathbb{Z}/\ell\mathbb{Z}$-graded $A$-modules and a derived-orbit category of $\Gamma$, which is a triangulated hull of the orbit category of the derived category.
Comment: 32 pages