Zero Divisor Graph of a Poset with Respect to Primal Ideals
In this paper, we extend the concepts of primal and
weakly primal ideals for posets. Further, the diameter of the zero
divisor graph of a poset with respect to a non-primal ideal is
determined. The relation between primary and primal ideals in posets
is also studied.
[1] D. F. Anderson and J. D. LaGrange, Commutative Boolean monoids,
reduced rings, and the compressed zero-divisor graph, J. Pure Appl.
Algebra, 216 (2012), 1626-1636.
[2] S. E. Attani, On primal and wekly primal ideals over commutative
semirings, Glasnik Matematicki, 43, (2008), 13-23.
[3] S. E. Attani and A. Y. Darani, Zero divisor graphs with respect to primal
and weakly primal ideas, J. Korean Math. Soc. 46 (2009), 313-325.
[4] I. Beck, Coloring of a Commutative Ring, J. Algebra 116 (1988), 208-
226 .
[5] F. R. DeMeyer, T. McKenzie and K. Schneider, The Zero-Divisor Graph
of a Commutative Semigroup, Semigroup Forum 65 (2002), 206-214.
[6] R. Halaˇs, Ideals and annihilators in ordered sets, Czech. Math . J. 45
(1995), 127-134.
[7] R. Halaˇs and H. L¨anger, The zero divisor graph of a qoset, Order 27,
343-351.
[8] R. Halaˇs and M. Jukl, On Beck’s coloring of posets, Discrete Math. 309
(2009), 4584-4589.
[9] V. V. Joshi, Zero divisor graph of a poset with respect to an ideal, Order
29 (2012), 499-506.
[10] V. V. Joshi and Nilesh Mundlik , On primary ideals in poset, Mathematica
Slovaca 65 (2016),1237-1250 .
[11] V. V. Joshi, B. N. Waphare, and H. Y. Pourali, Zero divisor graphs
of lattices and primal ideals, Asian-Eur. J. Math. 5 (2012), 1250037-
1250046.
[12] V. V. Joshi , B. N. Waphare and H. Y. Pourali, Generalized zero divisor
graph of a poset, Discrete Appl. Math. 161 (2013),1490-1495.
[13] V. V. Joshi, B. N. Waphare, and H. Y. Pourali, The graph of equivalence
classes of zero divisors, ISRN Discrete Math. (2014). Article ID 896270,
7 pages. http:// dx.doi.org/101155/2014/896270.
[14] H. Y. Pourali, V. V. Joshi and B. N. Waphare, Diameter of zero divisor
graphs of finite direct product of lattices, World Academy of Science,
Engineering and Technology. (2014). Vol: 8, No:9.
[15] D. Lu and T. Wu, The zeor divisor graphs of posets and an application
to semigroups, 26 (2010), 793-804.
[16] S. K. Nimbhorkar , M. P. Wasadikar and Lisa DeMeyer, Coloring of
semilattices, Ars Comb. 12 (2007), 97-104 .
[17] S.P. Redmond, The zero-divisor graph of a non-commutative ring, Int.
J. Comm. Rings 4 (2002), 203-211.
[18] P. V. Venkatanarsimhan, Semi-ideals in posets, Math. Annalen 185
(1970), 338-348.
[19] D. B. West, Introduction to Graph Theory, Practice Hall, New Delhi,
2009.
[1] D. F. Anderson and J. D. LaGrange, Commutative Boolean monoids,
reduced rings, and the compressed zero-divisor graph, J. Pure Appl.
Algebra, 216 (2012), 1626-1636.
[2] S. E. Attani, On primal and wekly primal ideals over commutative
semirings, Glasnik Matematicki, 43, (2008), 13-23.
[3] S. E. Attani and A. Y. Darani, Zero divisor graphs with respect to primal
and weakly primal ideas, J. Korean Math. Soc. 46 (2009), 313-325.
[4] I. Beck, Coloring of a Commutative Ring, J. Algebra 116 (1988), 208-
226 .
[5] F. R. DeMeyer, T. McKenzie and K. Schneider, The Zero-Divisor Graph
of a Commutative Semigroup, Semigroup Forum 65 (2002), 206-214.
[6] R. Halaˇs, Ideals and annihilators in ordered sets, Czech. Math . J. 45
(1995), 127-134.
[7] R. Halaˇs and H. L¨anger, The zero divisor graph of a qoset, Order 27,
343-351.
[8] R. Halaˇs and M. Jukl, On Beck’s coloring of posets, Discrete Math. 309
(2009), 4584-4589.
[9] V. V. Joshi, Zero divisor graph of a poset with respect to an ideal, Order
29 (2012), 499-506.
[10] V. V. Joshi and Nilesh Mundlik , On primary ideals in poset, Mathematica
Slovaca 65 (2016),1237-1250 .
[11] V. V. Joshi, B. N. Waphare, and H. Y. Pourali, Zero divisor graphs
of lattices and primal ideals, Asian-Eur. J. Math. 5 (2012), 1250037-
1250046.
[12] V. V. Joshi , B. N. Waphare and H. Y. Pourali, Generalized zero divisor
graph of a poset, Discrete Appl. Math. 161 (2013),1490-1495.
[13] V. V. Joshi, B. N. Waphare, and H. Y. Pourali, The graph of equivalence
classes of zero divisors, ISRN Discrete Math. (2014). Article ID 896270,
7 pages. http:// dx.doi.org/101155/2014/896270.
[14] H. Y. Pourali, V. V. Joshi and B. N. Waphare, Diameter of zero divisor
graphs of finite direct product of lattices, World Academy of Science,
Engineering and Technology. (2014). Vol: 8, No:9.
[15] D. Lu and T. Wu, The zeor divisor graphs of posets and an application
to semigroups, 26 (2010), 793-804.
[16] S. K. Nimbhorkar , M. P. Wasadikar and Lisa DeMeyer, Coloring of
semilattices, Ars Comb. 12 (2007), 97-104 .
[17] S.P. Redmond, The zero-divisor graph of a non-commutative ring, Int.
J. Comm. Rings 4 (2002), 203-211.
[18] P. V. Venkatanarsimhan, Semi-ideals in posets, Math. Annalen 185
(1970), 338-348.
[19] D. B. West, Introduction to Graph Theory, Practice Hall, New Delhi,
2009.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:76126", author = "Hossein Pourali", title = "Zero Divisor Graph of a Poset with Respect to Primal Ideals", abstract = "In this paper, we extend the concepts of primal and
weakly primal ideals for posets. Further, the diameter of the zero
divisor graph of a poset with respect to a non-primal ideal is
determined. The relation between primary and primal ideals in posets
is also studied.", keywords = "Zero divisors graph, ideal, prime ideal, semiprime
ideal, primal ideal, weakly primal ideal, associated prime ideal,
primary ideal.", volume = "11", number = "8", pages = "375-5", }
