P*-Invariant ideals in rings of invariants.
Polyèdre caractéristique et éclatements combinatoires.
Polynôme d'Hilbert-Samuel des clôtures intégrales des puissances d'un idéal m-primaire
Polynomes à valeurs entières sur un anneau non analytiquement irréductible.
Polynomial rings over pseudovaluation rings.
Polynomials with high multiplicity
Polyserial modules over valuation domains
Premiers, copremiers et fibrés
Primary elements in Prüfer lattices
In this paper we study primary elements in Prüfer lattices and characterize -lattices in terms of Prüfer lattices. Next we study weak ZPI-lattices and characterize almost principal element lattices and principal element lattices in terms of ZPI-lattices.
Primary ideals with finitely generated radical in a commutative ring.
Prime ideals in universal algebras
Prime, weakly prime and almost prime elements in multiplication lattice modules
In this paper, we study multiplication lattice modules. We establish a new multiplication over elements of a multiplication lattice module.With this multiplication, we characterize idempotent element, prime element, weakly prime element and almost prime element in multiplication lattice modules.
Principal ideal theorems for holomorphy rings in fields.
Projective modules and prime submodules
In this paper, we use Zorn’s Lemma, multiplicatively closed subsets and saturated closed subsets for the following two topics: (i) The existence of prime submodules in some cases, (ii) The proof that submodules with a certain property satisfy the radical formula. We also give a partial characterization of a submodule of a projective module which satisfies the prime property.
Propriété d'approximation pour les éléments algébriques
Pseudobetragsfunktionen auf Quotientenkörpern von Dedekindringen.
Pseudo-valuation rings. II
Viene data una condizione sufficiente affinchè un sopra-anello di un anello di pseudo-valutazione (PVR) sia ancora un PVR. Da ciò segue che se è un PVR, allora ogni sopra-anello di è un PVR se (e soltanto se) è quasi-locale per ciascun elemento di . Vari risultati sono dimostrati per un ideale primo di un anello commutativo arbitrario , avente come insieme di zero-divisori. Per esempio, se è un primo «forte» di e contiene un elemento non-zero divisore di , allora è un sopra-anello...
Pullbacks and universal catenarity
Pure submodules of multiplication modules.