TY - JOUR
T1 - On Analysis of Topological Aspects for Subdivision of Kragujevac Tree Networks
AU - Kanwal, Salma
AU - Shang, Shanshan
AU - Siddiqui, Muhammad Kamran
AU - Shaikh, Tahira Sumbal
AU - Afzal, Ammara
AU - Asare-Tuah, Anton
N1 - Publisher Copyright:
Copyright © 2021 Salma Kanwal et al.
PY - 2021
Y1 - 2021
N2 - In this paper, we have taken review of certain topological topological characteristics of subdivision and the line graph of subdivision of Kragujevac tree. A Kragujevac tree is denoted by K, K ∈ Kgq=r(2t+1)+1,r, with order r(2t + 1) + 1 and size r(2t + 1), respectively. We have computed the Zagreb polynomials, forgotten polynomial, and M-polynomial for Kragujevac tree. Moreover, we have computed topological indices like Zagreb-type indices, reduced reciprocal Randić indices, family of Gourava indices as well as forgotten index. Further, some topological indices that can be directly derived from M-polynomial, i.e., first and second Zagreb index, modified second Zagreb index, Randić and reciprocal Randić index, symmetric division and harmonic index, and inverse sum and augmented Zagreb index are also computed.
AB - In this paper, we have taken review of certain topological topological characteristics of subdivision and the line graph of subdivision of Kragujevac tree. A Kragujevac tree is denoted by K, K ∈ Kgq=r(2t+1)+1,r, with order r(2t + 1) + 1 and size r(2t + 1), respectively. We have computed the Zagreb polynomials, forgotten polynomial, and M-polynomial for Kragujevac tree. Moreover, we have computed topological indices like Zagreb-type indices, reduced reciprocal Randić indices, family of Gourava indices as well as forgotten index. Further, some topological indices that can be directly derived from M-polynomial, i.e., first and second Zagreb index, modified second Zagreb index, Randić and reciprocal Randić index, symmetric division and harmonic index, and inverse sum and augmented Zagreb index are also computed.
UR - http://www.scopus.com/inward/record.url?scp=85123007511&partnerID=8YFLogxK
U2 - 10.1155/2021/9082320
DO - 10.1155/2021/9082320
M3 - Article
AN - SCOPUS:85123007511
SN - 1024-123X
VL - 2021
JO - Mathematical Problems in Engineering
JF - Mathematical Problems in Engineering
M1 - 9082320
ER -