Generator Ideals in Noetherian PI Rings

A new ideal I\*, the kernel coefficient ideal of a nonprincipal ideal I, is introduced in a commutative Noetherian ring R. Various properties of this ideal and its relations with many other standard concepts are studied. I\* is also examined in terms of a sequence of subideals I and the relation typ

Let R be a hereditary Noetherian prime ring. We determine a full set of invariants for the isomorphism class of any finitely generated projective R-module of uniform dimension at least 2. In particular we prove that P ⊕ X ∼ = Q ⊕ X implies P ∼ = Q whenever P has uniform dimension at least 2. Among t

We describe the structure of infinitely generated projective modules over hereditary Noetherian prime rings. The isomorphism invariants are uniform dimension and ranks at maximal ideals. Infinitely generated projective modules need not be free. However, every uncountably generated projective module

Let A be a finitely generated module over a (Noetherian) local ring R M . We say that a nonzero submodule B of A is basically full in A if no minimal basis for B can be extended to a minimal basis of any submodule of A properly containing B. We prove that a basically full submodule of A is M-primary

Let R s k x , . . . , x r x q иии qx , where k is a field of characteristic p, p does not divide d, and n G 3. If pd, then the test ideal for R is contained in Ž . py 1 Ž . py 1 x , . . . , x . If d s p q 1, then the test ideal for R is equal to x , . . . , x .