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Integral Domains in Which Every Nonzero w-Flat Ideal Is w-Invertible
Abstract: Let D be an integral domain and w be the so-called w-operation on D. We define D to be a w-FF domain if every w-flat w-ideal of D is of w-finite type. This paper presents some properties of w-FF domains and related domains. Among other things, we study the w-FF property in the polynomial extension, the t-Nagata ring and the pullback construction.
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“…Proof. Let I be a nonzero ideal of R. Since R is a PvMD, I w and so I is a w-flat ideal (i.e., IR P is flat for each P 2 t-MaxðRÞ) by [44,Proposition 2]. Since IR P is weakly ES-stable for each P 2 t-MaxðRÞ, I 2 R P ¼ JR P IR P for some invertible ideal JR P of R P by [8, Proposition 2.1].…”
Section: Some Results On T-locally Weakly Es-stabilitymentioning
confidence: 99%
“…Proof. Let I be a nonzero ideal of R. Since R is a PvMD, I w and so I is a w-flat ideal (i.e., IR P is flat for each P 2 t-MaxðRÞ) by [44,Proposition 2]. Since IR P is weakly ES-stable for each P 2 t-MaxðRÞ, I 2 R P ¼ JR P IR P for some invertible ideal JR P of R P by [8, Proposition 2.1].…”
Section: Some Results On T-locally Weakly Es-stabilitymentioning
confidence: 99%
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