Ideals in Polynomial Rings and the Module of Differentials

We introduce and impose conditions under which the finitely generated essential right ideals of E may be classified in terms of k-submodules of M. This yields a classification of the domains Morita equivalent to E when E is a Noetherian domain. For example, a special case of our results is:

This paper presents an algorithm for the Quillen-Suslin Theorem for quotients of polynomial rings by monomial ideals, that is, quotients of the form A = k[x 0 , . . . , xn]/I, with I a monomial ideal and k a field. Vorst proved that finitely generated projective modules over such algebras are free.

Let \(A\) be a commutative Noetherian and reduced ring. If \(A\) has an étale covering \(B\) such that all the irreducible components of \(B\) are geometric unibranches, we will construct an invariant ideal \(\gamma(A)\) of \(A\) which has the following properties: If \(A\) is an algebra over some r

For any representation of a p-group G on a vector space of dimension 3 over a finite field k of characteristic p, we show how the symmetric algebra, regarded as a kG-module, can be expressed as a direct sum of kG-modules, each one of which is isomorphic to a summand in low degree. It follows that, f