Modules of finite projective dimension and cocovers

Let a region 0 of the euclidean space R d (d 1) be decomposed as a polyhedral complex g, and let S r (g) denote the set of all multivariate c r -splines on g. Then, with pointwise operations, the set S r (g) turns out to be a finitely generated torsion free module over the ring R=R[x 1 , ..., x d ]

In this paper, we study the existence of ⊥ -envelopes, -envelopes, ⊥ -envelopes, -covers, and -covers where and denote the classes of modules of injective and projective dimension less than or equal to a natural number n, respectively. We prove that over any ring R, special ⊥ -preenvelopes and speci

Let G be a group in the class LHᑠ of locally hierarchically decomposable groups and let R be a strongly G-graded algebra. We provide a characterization of the R-modules of type FP under the assumptions that R is coherent and of finite ϱ 1 global dimension.