Module structures on the K-theory of graded rings

Let \(R=\oplus_{n \in \mathbb{Z}} R_{n}\) be a left Noetherian, left graded regular \(\mathbb{Z}\)-graded ring (i.e., every finitely generated graded \(R\)-module has finite projective dimension). We prove that if every finitely generated graded projective \(R\)-module is graded stably free then eve

Let I be an ᒊ-primary ideal in a Buchsbaum local ring A, ᒊ . In this paper, we investigate the Buchsbaum property of the associated graded ring of I when the equality I 2 s ᒎ I holds for some minimal reduction ᒎ of I. However, the Buchsbaum property does not always follow even if I 2 s ᒎ I. So we gi

We study the Jacobson radical of semigroup graded rings. We show that the Jacobson radical of a ring graded by a (locally) finite semigroup is (locally) nilpotent if the same is true of each homogeneous component corresponding to an idempotent semigroup element and that a ring graded by a finite sem