The Zero Divisor Graph of the Ring Z_(2^2 p)

Shuker; Nazar H.;Rashed; Payman A.;

The Zero Divisor Graph of the Ring Z_(2^2 p)

Clicks: 231

ID: 46034

2016

Free PDF

Article Quality & Performance Metrics

Overall Quality Improving Quality

0.0 /100

Combines engagement data with AI-assessed academic quality

Reader Engagement Emerging Content

7.5 /100

25 views

25 readers

AI Quality Assessment

Not analyzed

Abstract

EN
- Turkish
- Spanish
- Portuguese
- Arabic
- Chinese
- French
- German
- Indonesian
- Russian
- Thai

In this paper, we consider the crossing number and the chromatic number of the zero divisor graph Γ(Z_(2^2 p)) to show that this type of zero divisor graphs is bipartite graph, and the smallest cycle in Γ(Z_(2^2 p)) is of length four this implies that the girth is equal four.

Reference Key	shuker2016thearothe Use this key to autocite in the manuscript while using SciMatic Manuscript Manager or Thesis Manager
Authors	Shuker, Nazar H.;Rashed, Payman A.;
Journal	aro-the scientific journal of koya university
Year	2016
DOI	DOI not found Searching for DOI...
URL	http://aro.koyauniversity.org/article/view/190
Keywords	Technology Science agriculture mathematics applied mathematics. quantitative methods

Citations

No citations found. To add a citation, contact the admin at info@scimatic.org

Comments

Login to comment Register

No comments yet. Be the first to comment on this article.