Quantitative structure-activity and structure-property associations of natural systems require
terminologies for their topological properties. Structure-based topological descriptors/indices …

In this paper, we determine the efficiency of all commonly occurring eigenvalues‐based
topological descriptors for measuring the π‐electronic energy of lower polycyclic aromatic …

The use of graph theory can be visualized in nanochemistry, computer networks, Google
maps, and molecular graph which are common areas to elaborate application of this subject …

The study centered on Quantitative Structure Property Relationship (QSPR) analysis with a
focus on various graph energies, investigating drugs like Mefloquinone, Sertraline …

The Hosoya polynomial of a graph encompasses many of its metric properties, for instance
the Wiener index (alias average distance) and the hyper-Wiener index. An expression is …

We obtain a large number of degree and distance-based topological indices, graph and
Laplacian spectra and the corresponding polynomials, entropies and matching polynomials …

The Wiener dimension of a connected graph is introduced as the number of different
distances of its vertices. For any integer D and any integer k, a graph of diameter D and of …

The researches on topological indices are initially related to graphs obtained from biological
activities or chemical structures and reactivity. Recently, the research on this topic has …

Metal-organic frameworks (MOFs) play a pivotal role in modern material science, offering
unique properties such as flexibility, substantial pore space, distinctive structure, and large …

The status of a vertex u, denoted by σ G (u), is the sum of the distances between u and all
other vertices in a graph G. The first and second status connectivity indices of a graph G are …