Submodules of minimal Buchsbaum–Rim multiplicity and applications

The Buchsbaum-Rim multiplicity is a generalization of the Samuel multiplicity and is deÿned on submodules of free modules M ⊂ F of a local Noetherian ring A such that M ⊂ mF and F=M has ÿnite length. Let A = k[x; y] (x; y) be a localization of a polynomial ring over a ÿeld. When F=M is isomorphic to

This paper begins by introducing and characterizing Buchsbaum-Rim sheaves on Z = Proj R, where R is a graded Gorenstein K-algebra. They are reflexive sheaves arising as the sheafification of kernels of sufficiently general maps between free Rmodules. Then we study multiple sections of a Buchsbaum-Ri

It is routine to check that I 3 s QI 2 and ᒊ I : Q. We will show

The present article gives certain conditions for Rees modules to obtain Buchsbaumness. Suppose a given -primary ideal is of minimal multiplicity in the equi-I-invariant case. Then it is shown that the positively graded submodule of the Rees module must be Buchsbaum and moreover that the Rees module

We describe a new condensation method for computing the submodule lat tice of a module for a finite dimensional algebra over a finite field, which exploits the idea of condensation and extends it to the case of primitive idempotents. The method has been implemented in the new \(C\) version of the ME