The weighted vertex PI index

Abstract

The vertex PI index is a distance--based molecular structure descriptor, that recently found numerous chemical applications. In order to increase diversity of this topological index for bipartite graphs, we introduce weighted version defined as PIw (G) = Σe = uv ∈ E (deg (u) + deg (v)) (nu (e) + nv (e)), where deg (u) denotes the vertex degree of u and nu (e) denotes the number of vertices of G whose distance to the vertex u is smaller than the distance to the vertex v. We establish basic properties of PIw (G), and prove various lower and upper bounds. In particular, the path Pn has minimal, while the complete tripartite graph Kn/3, n/3, n/3 has maximal weighed vertex PI index among graphs with n vertices. We also compute exact expressions for the weighted vertex PI index of the Cartesian product of graphs. Finally we present modifications of two inequalities and open new perspectives for the future research.