A Vanishing Theorem for Schur Modules

We present a generalization of the classical Schur modules of GL(n) exhibiting the same interplay among algebra, geometry, and combinatorics. A generalized Young diagram D is an arbitrary finite subset of N\_N. For each D, we define the Schur module S D of GL(n). We introduce a projective variety F

Let U be the quantised enveloping algebra associated to a finite-type w x w x root datum, as defined by Drinfeld 10 and Jimbo 17 , and modified by w x w y1 x Ž . Lusztig 24 . Put A A s ‫ޚ‬ q, q . In the first instance U is a ‫ޑ‬ q -algebra; by analogy with the Kostant ‫-ޚ‬form of the classical envel

The main focus of his paper was to understand when the tensor product M m N of finitely generated modules M and N over a regular local ring R R is torsion-free. This condition forces the vanishing of a certain Tor module associated with M and N, which in turn, by Auslander's famous R Ž . rigidity th

We prove a version of the Krull-Schmidt theorem which applies to Noetherian modules. As a corollary we get the following cancellation rule: then there are modules A ≤ A and B ≤ B such that A ∼ = B and len A = len A = len B = len B. Here the ordinal valued length, len A, of a module A is as defined