Topological analysis of eccentricity-based invariants for second type of dominating David-derived network
Haidar Ali,
Ali B.M. Ali,
Didar Abdulkhaleq Ali,
Ayesha Umer,
M. Ijaz Khan,
Saima Mushtaq,
Rasan Sarbast Faisal
Affiliations
Haidar Ali
Department of Mathematics, University Community College, Government College University, Faisalabad, Pakistan
Ali B.M. Ali
Air Conditioning Engineering Department, College of Engineering, University of Warith Al-Anbiyaa, Karbala, Iraq
Didar Abdulkhaleq Ali
Department of Mathematics, Faculty of Science, University of Zakho, Zakho, Iraq
Ayesha Umer
Department of Mathematics, Riphah International University, Faisalabad, Pakistan
M. Ijaz Khan
Department of Mechanical Engineering, College of Engineering, Prince Mohammad Bin Fahd University, Al-Khobar, Saudi Arabia; Corresponding author.
Saima Mushtaq
Department of Sciences, The Superior University, Lahore, Pakistan
Rasan Sarbast Faisal
Department of Petroleum Engineering, College of Engineering, Knowledge University, Erbil 44001, Iraq; Department of Petroleum Engineering, Al-Kitab University, Altun Kupri, Iraq
The rapid growth of graph theory has sparked interest among analysts, driven by its diverse applications in mathematical chemistry. Closed-form solutions enable rapid property prediction without expensive simulations. This study delves into the second type of dominating David-derived network, which play a vital role in pharmaceutical development, hardware engineering, and system administration. We examine the topological features of the network, calculating distance-based indices like eccentricity measures and the eccentricity based Zagreb indices. Our findings offer novel perspectives on the structural attributes of dominating David-derived network, highlighting their potential impact across various disciplines.
