Prime Graph of Cartesian Product of Rings

Sanjoy Kalita; Kuntala Patra

Call for Paper

June Edition

IJCA solicits high quality original research papers for the upcoming June edition of the journal. The last date of research paper submission is 20 May 2024

Submit your paper

Know more

The week's pick

Enhancing Privacy Preservation: Multi-Attribute Protection with P-Sensitive K-Anonymity

Twinkle Patel Kiran Amin

Random Articles

Sliding Mode Control of Half-car Active Suspension

Dec

2016

Article:Development of Mathematical Model for Market-Oriented Cloud Computing

November

2010

Investigation of Performance-Security Tradeoff in Robotic Mobile Wireless Ad hoc Networks (RANETs) using Stochastic Petri Nets

January

2013

Wavelet and Curvelet Transformation based Image Fusion with ANFIS and SVM

July

2015

Reseach Article

Prime Graph of Cartesian Product of Rings

by Sanjoy Kalita, Kuntala Patra

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 69 - Number 10

Year of Publication: 2013

Authors: Sanjoy Kalita, Kuntala Patra

10.5120/11877-7681

Sanjoy Kalita, Kuntala Patra . Prime Graph of Cartesian Product of Rings. International Journal of Computer Applications. 69, 10 ( May 2013), 13-16. DOI=10.5120/11877-7681

@article{ 10.5120/11877-7681,

author = { Sanjoy Kalita, Kuntala Patra },

title = { Prime Graph of Cartesian Product of Rings },

journal = { International Journal of Computer Applications },

issue_date = { May 2013 },

volume = { 69 },

number = { 10 },

month = { May },

year = { 2013 },

issn = { 0975-8887 },

pages = { 13-16 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume69/number10/11877-7681/ },

doi = { 10.5120/11877-7681 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-06T21:29:52.726347+05:30

%A Sanjoy Kalita

%A Kuntala Patra

%T Prime Graph of Cartesian Product of Rings

%J International Journal of Computer Applications

%@ 0975-8887

%V 69

%N 10

%P 13-16

%D 2013

%I Foundation of Computer Science (FCS), NY, USA

Abstract

Let R be a commutative ring. The prime graph of the ring R is defined as a graph whose vertex set consists of all elements of R and any two distinct vertices x and y are adjacent if and only if xRy=0 or yRx=0. This graph is denoted by PG(R). In this paper we investigate some relations between the chromatic number of prime graph of finite product of commutative rings and the chromatic number of prime graph of these rings. We also obtain some results on the chromatic number of prime graph of the ring Z_m×Z_n.

References

D. F. Anderson and P. S. Livingston, The Zero-divisor graph of a commutative ring, J. Algebra 217 (1999), no. 2, 434–447.
I. Beck, Coloring of commutative rings, J. Algebra 116 (1988), no. 1, 208–226.
S. Bhavanari , S. P. Kuncham and N. Dasaari, Prime Graph of a Ring, J. of Combinatorics, Information and System Sources, vol 35 (2010) No 1-2, 27-42.
F. Harary, Graph Theory, Eddison Wesley Publishing Company inc. 1969.
J. Lambek, Lectures on Rings and Modules, Blaisdel Publ. Co. 1966.

Index Terms

Computer Science

Information Sciences

Keywords

Prime Graph Chromatic Numbers Rings Product of rings