Gyu-Whan Chang scite author profile

Gyu-Whan Chang

4Publications

11Citation Statements Received

7Citation Statements Given

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Kaplansky-type Theorems, II

Chang¹,

Kim²

2011

Kyungpook mathematical journal

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Let D be an integral domain with quotient field K, X be an indeterminate over D, and D[X] be the polynomial ring over D. A prime ideal Q of D[X] is called an upper to zero in D[X] if Q = f K[X] ∩ D[X] for some f ∈ D[X]. In this paper, we study integral domains D such that every upper to zero in D[X] contains a prime element (resp., a primary element, a t-invertible primary ideal, an invertible primary ideal).

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LOCALLY PSEUDO-VALUATION DOMAINS OF THE FORM D[X]_Nv

Chang¹

2008

Journal of the Korean Mathematical Society

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-NOETHERIAN DOMAINS AND THE RING D[X]_N, II

Chang¹

2011

Journal of the Korean Mathematical Society

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Compactness of a Subspace of the Zariski Topology on Spec(d)

Chang¹

2011

Honam Mathematical Journal

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Abstract. Let D be an integral domain, Spec(D) the set of prime ideals of D, and X a subspace of the Zariski topology on Spec(D). We show that X is compact if and only if given any ideal I of D with I P for all P ∈ X, there exists a finitely generated ideal J ⊆ I such that J P for all P ∈ X. We also prove that if D = ∩P ∈X DP and if * is the star-operation on D induced by X, then X is compact if and only if * f -Max(D) ⊆ X. As a corollary, we have that t-Max(D) is compact and that P(D) = {P ∈ Spec(D)|P is minimal over (a : b) for some a, b ∈ D} is compact if and only if t-Max(D) ⊆ P(D).

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Gyu-Whan Chang

Kaplansky-type Theorems, II

LOCALLY PSEUDO-VALUATION DOMAINS OF THE FORM D[X]_Nv

-NOETHERIAN DOMAINS AND THE RING D[X]_N, II

Compactness of a Subspace of the Zariski Topology on Spec(d)

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Gyu-Whan Chang

Kaplansky-type Theorems, II

LOCALLY PSEUDO-VALUATION DOMAINS OF THE FORM D[X]Nv

*-NOETHERIAN DOMAINS AND THE RING D[X]N*, II

Compactness of a Subspace of the Zariski Topology on Spec(d)

Contact Info

Product

Resources

About

LOCALLY PSEUDO-VALUATION DOMAINS OF THE FORM D[X]_Nv

-NOETHERIAN DOMAINS AND THE RING D[X]_N, II