The two first levels of Spider´s Web planar graph and The Network planar graph

Author

Essalih, Mohamed ; El Marraki, Mohamed ; Aboutajdine, Driss

Author_Institution

Telecommun. & Comput. Sci. Res. Lab., Univ. Mohammed-V, Rabat, Morocco

fYear

2012

fDate

10-12 May 2012

Firstpage

57

Lastpage

60

Abstract

The theory of graphs, with its diverse applications in natural (Chemistry, Biology) and social sciences in general and in theoretical computer science in particular, is becoming an important component of the mathematics curriculum in colleges and universities all over the world. In this paper we present some theoretical results about some topological indices, like the Wiener index W, Degree distance index DD and the Hyper-Wiener index WW of a graph G. In the application section we are going to apply these theoretic results, for the two first levels of the Spider´s Web planar graph R_n and the two first levels of the Network planar graph G_n, to give their Wiener index, Degree distance index and Hyper-Wiener index.

Keywords

graph theory; biology; chemistry; colleges; degree distance index; graph theory; hyper-Wiener index; mathematics curriculum; natural sciences; network planar graph; social sciences; spider web planar graph; theoretical computer science; topological indices; universities; Cities and towns; Computers; Educational institutions; Electronic mail; Indexes; Laboratories; Degree distance index; Graph; Hyper-Wiener index; Network planar graph; Spider´s planer graph; Wiener index;

fLanguage

English

Publisher

ieee

Conference_Titel

Multimedia Computing and Systems (ICMCS), 2012 International Conference on

Conference_Location

Tangier

Print_ISBN

978-1-4673-1518-0

Type

conf

DOI

10.1109/ICMCS.2012.6320164

Filename

6320164