Research Article
Year 2018,
Volume: 23 Issue: 23, 115 - 130, 11.01.2018
Abstract
References
- F. Aliniaeifard, M. Behboodi, E. Mehdi-Nezhad and A. M. Rahimi, The annihilating-ideal graph of a commutative ring with respect to an ideal, Comm. Algebra, 42(5) (2014), 2269-2284.
- D. D. Anderson and M. Naseer, Beck's coloring of a commutative ring, J. Algebra, 159(2) (1993), 500-514.
- D. F. Anderson and P. S. Livingston, The zero-divisor graph of a commutative ring, J. Algebra, 217(2) (1999), 434-447.
- D. F. Anderson, R. Levy and J. Shapiro, Zero-divisor graphs, von Neumann regular rings, and Boolean algebras, J. Pure Appl. Algebra, 180(3) (2003), 221-241.
- D. F. Anderson, A. Frazier, A. Lauve and P. S. Livingston, The zero-divisor graph of a commutative ring, II, in Ideal Theoretic Methods in Commutative Algebra, Lecture Notes in Pure and Appl. Math., 220, Dekker, New York, (2001), 61-72.
- D. F. Anderson, S. Ghalandarzadeh, S. Shirinkam and P. Malakooti Rad, On the diameter of the graph Ann(M)(R), Filomat, 26(3) (2012), 623-629.
- H. Ansari-Toroghy and F. Farshadifar, The dual notion of multiplication mod- ules, Taiwanese J. Math., 11(4) (2007), 1189-1201.
- H. Ansari-Toroghy and F. Farshadifar, Strong comultiplication modules, CMU. J. Nat. Sci., 8(1) (2009), 105-113.
- H. Ansari-Toroghy and F. Farshadifar, The dual notions of some generaliza- tions of prime submodules, Comm. Algebra, 39(7) (2011), 2396-2416.
- H. Ansari-Toroghy and F. Farshadifar, On the dual notion of prime submod- ules, Algebra Colloq., 19(spec 1) (2012), 1109-1116.
- H. Ansari-Toroghy and F. Farshadifar, Fully idempotent and coidempotent modules, Bull. Iranian Math. Soc., 38(4) (2012), 987-1005.
- H. Ansari-Toroghy and F. Farshadifar, On the dual notion of prime radicals of submodules, Asian-Eur. J. Math., 6(2) (2013), 1350024 (11 pp).
- I. Beck, Coloring of commutative rings, J. Algebra, 116(1) (1988), 208-226.
- G. A. Cannon, K. M. Neuerburg and S. P. Redmond, Zero-divisor graphs of nearrings and semigroups, in Nearrings and Near elds (eds: H. Kiechle, A. Kreuzer, M.J. Thomsen), Springer, Dordrecht, (2005), 189-200.
- S. Ceken, M. Alkan and P. F. Smith, The dual notion of the prime radical of a module, J. Algebra, 392 (2013), 265-275.
- P. Dheena and B. Elavarasan, An ideal-based zero-divisor graph of 2-primal near-rings, Bull. Korean Math. Soc., 46(6) (2009), 1051-1060.
- S. Ebrahimi Atani and A. Youse an Darani, Zero-divisor graphs with respect to primal and weakly primal ideals, J. Korean Math. Soc., 46(2) (2009), 313-325.
- L. Fuchs, W. Heinzer and B. Olberding, Commutative ideal theory without niteness conditions: Irreducibility in the quotient led, in: Abelian Groups, Rings, Modules and Homological Algebra, Lect. Notes Pure Appl. Math., 249, Chapman & Hall/CRC, Boca Raton, FL, (2006), 121-145.
- Sh. Ghalandarzadeh, S. Shirinkam and P. Malakooti Rad, Annihilator ideal- based zero-divisor graphs over multiplication modules, Comm. Algebra, 41(3) (2013), 1134-1148.
- I. Kaplansky, Commutative Rings, The University of Chicago Press, Chicago, 1974.
- H. R. Maimani, M. R. Pournaki and S. Yassemi, Zero-divisor graph with respect to an ideal, Comm. Algebra, 34(3) (2006), 923-929.
- S. P. Redmond, An ideal-based zero-divisor graph of a commutative ring, Comm. Algebra, 31(9) (2003), 4425-4443.
- S. Yassemi, Maximal elements of support and cosupport, May 1997, http://streaming.ictp.it/preprints/P/97/051.pdf.
- S. Yassemi, The dual notion of prime submodules, Arch. Math. (Brno), 37(4) (2001), 273-278.
- A. Youse an Darani, Notes on the ideal-based zero-divisor graph, J. Math. Appl., 32 (2010), 103-107.
Year 2018,
Volume: 23 Issue: 23, 115 - 130, 11.01.2018
Abstract
Let R be a commutative ring. In this paper, we study the annihilator
ideal-based zero-divisor graph by replacing the ideal I of R with the ideal
AnnR(M) for an R-module M. Also, we investigate a certain subgraph of the
annihilator ideal-based zero-divisor graph and obtain some related results.
Keywords
References
- F. Aliniaeifard, M. Behboodi, E. Mehdi-Nezhad and A. M. Rahimi, The annihilating-ideal graph of a commutative ring with respect to an ideal, Comm. Algebra, 42(5) (2014), 2269-2284.
- D. D. Anderson and M. Naseer, Beck's coloring of a commutative ring, J. Algebra, 159(2) (1993), 500-514.
- D. F. Anderson and P. S. Livingston, The zero-divisor graph of a commutative ring, J. Algebra, 217(2) (1999), 434-447.
- D. F. Anderson, R. Levy and J. Shapiro, Zero-divisor graphs, von Neumann regular rings, and Boolean algebras, J. Pure Appl. Algebra, 180(3) (2003), 221-241.
- D. F. Anderson, A. Frazier, A. Lauve and P. S. Livingston, The zero-divisor graph of a commutative ring, II, in Ideal Theoretic Methods in Commutative Algebra, Lecture Notes in Pure and Appl. Math., 220, Dekker, New York, (2001), 61-72.
- D. F. Anderson, S. Ghalandarzadeh, S. Shirinkam and P. Malakooti Rad, On the diameter of the graph Ann(M)(R), Filomat, 26(3) (2012), 623-629.
- H. Ansari-Toroghy and F. Farshadifar, The dual notion of multiplication mod- ules, Taiwanese J. Math., 11(4) (2007), 1189-1201.
- H. Ansari-Toroghy and F. Farshadifar, Strong comultiplication modules, CMU. J. Nat. Sci., 8(1) (2009), 105-113.
- H. Ansari-Toroghy and F. Farshadifar, The dual notions of some generaliza- tions of prime submodules, Comm. Algebra, 39(7) (2011), 2396-2416.
- H. Ansari-Toroghy and F. Farshadifar, On the dual notion of prime submod- ules, Algebra Colloq., 19(spec 1) (2012), 1109-1116.
- H. Ansari-Toroghy and F. Farshadifar, Fully idempotent and coidempotent modules, Bull. Iranian Math. Soc., 38(4) (2012), 987-1005.
- H. Ansari-Toroghy and F. Farshadifar, On the dual notion of prime radicals of submodules, Asian-Eur. J. Math., 6(2) (2013), 1350024 (11 pp).
- I. Beck, Coloring of commutative rings, J. Algebra, 116(1) (1988), 208-226.
- G. A. Cannon, K. M. Neuerburg and S. P. Redmond, Zero-divisor graphs of nearrings and semigroups, in Nearrings and Near elds (eds: H. Kiechle, A. Kreuzer, M.J. Thomsen), Springer, Dordrecht, (2005), 189-200.
- S. Ceken, M. Alkan and P. F. Smith, The dual notion of the prime radical of a module, J. Algebra, 392 (2013), 265-275.
- P. Dheena and B. Elavarasan, An ideal-based zero-divisor graph of 2-primal near-rings, Bull. Korean Math. Soc., 46(6) (2009), 1051-1060.
- S. Ebrahimi Atani and A. Youse an Darani, Zero-divisor graphs with respect to primal and weakly primal ideals, J. Korean Math. Soc., 46(2) (2009), 313-325.
- L. Fuchs, W. Heinzer and B. Olberding, Commutative ideal theory without niteness conditions: Irreducibility in the quotient led, in: Abelian Groups, Rings, Modules and Homological Algebra, Lect. Notes Pure Appl. Math., 249, Chapman & Hall/CRC, Boca Raton, FL, (2006), 121-145.
- Sh. Ghalandarzadeh, S. Shirinkam and P. Malakooti Rad, Annihilator ideal- based zero-divisor graphs over multiplication modules, Comm. Algebra, 41(3) (2013), 1134-1148.
- I. Kaplansky, Commutative Rings, The University of Chicago Press, Chicago, 1974.
- H. R. Maimani, M. R. Pournaki and S. Yassemi, Zero-divisor graph with respect to an ideal, Comm. Algebra, 34(3) (2006), 923-929.
- S. P. Redmond, An ideal-based zero-divisor graph of a commutative ring, Comm. Algebra, 31(9) (2003), 4425-4443.
- S. Yassemi, Maximal elements of support and cosupport, May 1997, http://streaming.ictp.it/preprints/P/97/051.pdf.
- S. Yassemi, The dual notion of prime submodules, Arch. Math. (Brno), 37(4) (2001), 273-278.
- A. Youse an Darani, Notes on the ideal-based zero-divisor graph, J. Math. Appl., 32 (2010), 103-107.
There are 25 citations in total.
Details
| Journal Section | Research Article |
|---|---|
| Authors | |
| Publication Date | January 11, 2018 |
| DOI | https://doi.org/10.24330/ieja.373650 |
| IZ | https://izlik.org/JA43RX22PX |
| Published in Issue | Year 2018 Volume: 23 Issue: 23 |