On Near Pseudo-Valuation Rings and Their Extensions”

Corrigendum To

On Near Pseudo-Valuation Rings and Their Extensions”

Year 2009, Volume: 6 Issue: 6, 0 - 0, 01.12.2009

Abstract

Example 4. Let R = Z(p). This is in fact a discrete valuation domain, and therefore, its maximal ideal P = pR is strongly prime. But pR[x] is not strongly prime in R[x] because it is not comparable with xR[x] (so the condition of being

Year 2009, Volume: 6 Issue: 6, 0 - 0, 01.12.2009

Corrigendum To

Abstract

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Details

Other ID	JA92FD96EP
Authors	Corrigendum To This is me
Publication Date	December 1, 2009
Published in Issue	Year 2009 Volume: 6 Issue: 6

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APA	To, C. (2009). On Near Pseudo-Valuation Rings and Their Extensions”. International Electronic Journal of Algebra, 6(6). https://izlik.org/JA69TN48JA
AMA	1.To C. On Near Pseudo-Valuation Rings and Their Extensions.” IEJA. 2009;6(6). https://izlik.org/JA69TN48JA
Chicago	To, Corrigendum. 2009. “On Near Pseudo-Valuation Rings and Their Extensions””. International Electronic Journal of Algebra 6 (6). https://izlik.org/JA69TN48JA.
EndNote	To C (December 1, 2009) On Near Pseudo-Valuation Rings and Their Extensions”. International Electronic Journal of Algebra 6 6
IEEE	[1]C. To, “On Near Pseudo-Valuation Rings and Their Extensions””, IEJA, vol. 6, no. 6, Dec. 2009, [Online]. Available: https://izlik.org/JA69TN48JA
ISNAD	To, Corrigendum. “On Near Pseudo-Valuation Rings and Their Extensions””. International Electronic Journal of Algebra 6/6 (December 1, 2009). https://izlik.org/JA69TN48JA.
JAMA	1.To C. On Near Pseudo-Valuation Rings and Their Extensions”. IEJA. 2009;6. Available at https://izlik.org/JA69TN48JA.
MLA	To, Corrigendum. “On Near Pseudo-Valuation Rings and Their Extensions””. International Electronic Journal of Algebra, vol. 6, no. 6, Dec. 2009, https://izlik.org/JA69TN48JA.
Vancouver	1.To C. On Near Pseudo-Valuation Rings and Their Extensions”. IEJA [Internet]. 2009 Dec. 1;6(6). Available from: https://izlik.org/JA69TN48JA