DG-Semiprimary DG-Algebras, Acyclicity and Hopkins-Levitzki Theorem for DG-Algebras
Abstract
We study the analogue of the Hopkins-Levitzky Theorem for dg-algebras (A,d). We first consider the Hopkins approach. Here we show that for acyclic dg-algebras with graded-Artinian algebras of cycles (d), we also have that (A,d) is left dg-Noetherian, and we show that acyclic dg-Artinian dg-algebras are dg-Noetherian. Then, studying the Levitzki approach, we consider a definition of a dg-semiprimary algebra. For dg-semiprimary dg-artinian dg-algebras (A,d), we show that all dg-simple dg-modules are acyclic, and so are all dg-modules with finite dg-composition length. We finally show that dg-Artinian dg-semiprimary dg-algebras with nilpotent dg-radical dgrad2(A,d) are dg-Noetherian and acyclic.
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