Abstract
We describe in the paper the graded centers of the bounded derived categories of the derived discrete algebras. In particular, we prove that if A is a derived discrete algebra, then the reduced part of the graded center of the bounded derived category of A is nontrivial if and only if A has infinite global dimension. Moreover, we show that the nilpotent part of the graded center is controlled by the objects for which the Auslander–Reiten translation coincides with a power of the suspension functor.
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