Frohn D. A (K)-ring satisfying the ascending chain condition on principal ideals that is not a principal ideal ring. AMERICAN MATHEMATICAL MONTHLY. 2005;112(6):523-524
An ideal I of a commutative ring R with identity is called an SFT (strong finite type) ideal if ther...
A ring is called an r-Noetherian ring if every regular ideal is finitely generated. Let R be an r-No...
AbstractThe quasi-Frobenius rings are characterized as the left continuous rings satisfying either (...
AbstractLet R be a ring, S a monoid and ω:S→End(R) a monoid homomorphism. In this paper we prove tha...
DoctorOne of the most frequently referenced monographs on power series rings, “Power Series over Com...
Let M be a module over a ring R, which satisfies the ascending chain condition on submodules of the ...
An ideal I of a commutative ring D with identity is called an SFT ideal if there exist a finitely ge...
Abstract: We carry out a study of rings R for which HomR(M,N) 6 = 0 for all nonzero N ≤MR. Such ring...
ABSTRACT. This paper deals with a question about the ascending and descending chain conditions on tw...
Abstract. Suppose that a semiprime (-1, 1) ring R is associative, satisfies the ascending chain cond...
We show that the ring of difference polynomials over a difference field does not satisfy the ascendi...
A ring D is called an SFT ring if for each ideal I of D, there exist a finitely generated ideal J of...
is a cyclic R-module, then I + J = R. The rings R such that R/I ⊕R/J is a cyclic R-module for all di...
Frohn D. A counterexample concerning accp in power series rings. Communications in Algebra. 2002;30(...
AbstractAn ideal I is called an SFT-ideal if there exist a natural number n and a finitely generated...
An ideal I of a commutative ring R with identity is called an SFT (strong finite type) ideal if ther...
A ring is called an r-Noetherian ring if every regular ideal is finitely generated. Let R be an r-No...
AbstractThe quasi-Frobenius rings are characterized as the left continuous rings satisfying either (...
AbstractLet R be a ring, S a monoid and ω:S→End(R) a monoid homomorphism. In this paper we prove tha...
DoctorOne of the most frequently referenced monographs on power series rings, “Power Series over Com...
Let M be a module over a ring R, which satisfies the ascending chain condition on submodules of the ...
An ideal I of a commutative ring D with identity is called an SFT ideal if there exist a finitely ge...
Abstract: We carry out a study of rings R for which HomR(M,N) 6 = 0 for all nonzero N ≤MR. Such ring...
ABSTRACT. This paper deals with a question about the ascending and descending chain conditions on tw...
Abstract. Suppose that a semiprime (-1, 1) ring R is associative, satisfies the ascending chain cond...
We show that the ring of difference polynomials over a difference field does not satisfy the ascendi...
A ring D is called an SFT ring if for each ideal I of D, there exist a finitely generated ideal J of...
is a cyclic R-module, then I + J = R. The rings R such that R/I ⊕R/J is a cyclic R-module for all di...
Frohn D. A counterexample concerning accp in power series rings. Communications in Algebra. 2002;30(...
AbstractAn ideal I is called an SFT-ideal if there exist a natural number n and a finitely generated...
An ideal I of a commutative ring R with identity is called an SFT (strong finite type) ideal if ther...
A ring is called an r-Noetherian ring if every regular ideal is finitely generated. Let R be an r-No...
AbstractThe quasi-Frobenius rings are characterized as the left continuous rings satisfying either (...
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