On 2-absorbing ideals of commutative rings

Ayman Badawi

doi:10.1017/S0004972700039344

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Suppose that R is a commutative ring with 1 ≠ 0. In this paper, we introduce the concept of 2-absorbing ideal which is a generalisation of prime ideal. A nonzero proper ideal I of R is called a 2-absorbing ideal of R if whenever a, b, c ∈ R and abc ∈ I, then ab ∈ I or ac ∈ I or bc ∈ I. It is shown that a nonzero proper ideal I of R is a 2-absorbing ideal if and only if whenever I1I2I3 ⊆ I for some ideals I1,I2,I3 of R, then I1I2 ⊆ I or I2I3 ⊆ I or I1I3 ⊆ I. It is shown that if I is a 2-absorbing ideal of R, then either Rad(I) is a prime ideal of R or Rad(I) = P1 ⋂ P2 where P1,P2 are the only distinct prime ideals of R that are minimal over I. Rings with the property that every nonzero proper ideal is a 2-absorbing ideal are characterised. All 2-absorbing ideals of valuation domains and Prüfer domains are completely described. It is shown that a Noetherian domain R is a Dedekind domain if and only if a 2-absorbing ideal of R is either a maximal ideal of R or M2 for some maximal ideal M of R or M1M2 where M1,M2 are some maximal ideals of R. If RM is Noetherian for each maximal ideal M of R, then it is shown that an integral domain R is an almost Dedekind domain if and only if a 2-absorbing ideal of R is either a maximal ideal of R or M2 for some maximal ideal M of R or M1M2 where M1,M2 are some maximal ideals of R.

References

[1]Badawi, A., ‘On φpseudo-valuation rings, II’, Houston J. Math. 26 (2000)), 473–480.Google Scholar

[2]Fuchs, L., Heinzer, W., and Olberding, B., ‘Commutative ideal theory without finiteness conditions: primal ideals’, Tran. Amer. Math. Soc. (to appear).Google Scholar

[3]Gilmer, R., Multiplicative ideal theory, Queen's Papers Pure Appl. Math. 90 (Queen's University, Kingston, 1992).Google Scholar

[4]Huckaba, J., Commutative rings with zero divisors (Marcel Dekker, New York, Basel, 1988).Google Scholar

[5]Larson, M.D. and McCarthy, P.J., Multiplicative theory of ideals (Academic Press, New York, London, 1971).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Anderson, D. D. and Bataineh, Malik 2008. Generalizations of Prime Ideals. Communications in Algebra, Vol. 36, Issue. 2, p. 686.

Anderson, David F. and Badawi, Ayman 2011. Onn-Absorbing Ideals of Commutative Rings. Communications in Algebra, Vol. 39, Issue. 5, p. 1646.

Payrovi, Sh. and Babaei, S. 2012. On 2-Absorbing Submodules. Algebra Colloquium, Vol. 19, Issue. spec01, p. 913.

Darani, Ahmad Yousefian 2012. On 2-Absorbing and Weakly 2-Absorbing Ideals of Commutative Semirings. Kyungpook mathematical journal, Vol. 52, Issue. 1, p. 91.

Ebrahimpour, M. and Nekooei, R. 2012. On Generalizations of Prime Ideals. Communications in Algebra, Vol. 40, Issue. 4, p. 1268.

Yousefian Darani, A. and Puczyłowski, E. R. 2013. On 2-absorbing commutative semigroups and their applications to rings. Semigroup Forum, Vol. 86, Issue. 1, p. 83.

Cahen, Paul-Jean Fontana, Marco Frisch, Sophie and Glaz, Sarah 2014. Commutative Algebra. p. 353.

Ebrahimpour, M. 2014. On Generalizations of Prime Ideals (II). Communications in Algebra, Vol. 42, Issue. 9, p. 3861.

Badawi, Ayman Tekir, Unsal and Yetkin, Ece 2014. ON 2-ABSORBING PRIMARY IDEALS IN COMMUTATIVE RINGS. Bulletin of the Korean Mathematical Society, Vol. 51, Issue. 4, p. 1163.

Jayaram, C. Tekir, Ünsal and Yetkin, Ece 2014. 2-Absorbing and Weakly 2-Absorbing Elements in Multiplicative Lattices. Communications in Algebra, Vol. 42, Issue. 6, p. 2338.

Farzalipour, Farkhonde 2014. On Almost Semiprime Submodules. Algebra, Vol. 2014, Issue. , p. 1.

Dubey, Manish Kant and Aggarwal, Pakhi 2015. On 2-absorbing submodules over commutative rings. Lobachevskii Journal of Mathematics, Vol. 36, Issue. 1, p. 58.

Darani, Ahmad Yousefian and Mostafanasab, Hojjat 2015. On 2-absorbing preradicals. Journal of Algebra and Its Applications, Vol. 14, Issue. 02, p. 1550017.

Darani, Ahmad Yousefian and Mostafanasab, Hojjat 2015. Co-2-absorbing preradicals and submodules. Journal of Algebra and Its Applications, Vol. 14, Issue. 07, p. 1550113.

Dubey, Manish Kant and Aggarwal, Pakhi 2015. On 2-absorbing primary submodules of modules over commutative ring with unity. Asian-European Journal of Mathematics, Vol. 08, Issue. 04, p. 1550064.

Badawi, Ayman Tekir, Unsal and Yetkin, Ece 2015. ON WEAKLY 2-ABSORBING PRIMARY IDEALS OF COMMUTATIVE RINGS. Journal of the Korean Mathematical Society, Vol. 52, Issue. 1, p. 97.

Moghimi, Hosein Fazaeli and Naghani, Sadegh Rahimi 2016. ON n-ABSORBING IDEALS AND THE n-KRULL DIMENSION OF A COMMUTATIVE RING. Journal of the Korean Mathematical Society, Vol. 53, Issue. 6, p. 1225.

Donadze, Guram 2016. The Anderson-Badawi conjecture for commutative algebras over infinite fields. Indian Journal of Pure and Applied Mathematics, Vol. 47, Issue. 4, p. 691.

Dubey, Manish Kant and Aggarwal, Pakhi 2016. On n-absorbing submodules of modules over commutative rings. Beiträge zur Algebra und Geometrie / Contributions to Algebra and Geometry, Vol. 57, Issue. 3, p. 679.

Tekir, Unsal Koç, Suat Oral, Kursat Hakan and Shum, Kar Ping 2016. On 2-Absorbing Quasi-Primary Ideals in Commutative Rings. Communications in Mathematics and Statistics, Vol. 4, Issue. 1, p. 55.

Download full list

Article contents

On 2-absorbing ideals of commutative rings

Extract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests