We determine some classical distance-based and degree-based topological indices of the connected antiregular graphs (maximally irregular graphs). More precisely, we obtain explicitly the k-Wiener index, the hyper-Wiener index, the degree distance, the Gutman index, the first, second and third Zagreb index, the reduced first and second Zagreb index, the forgotten Zagreb index, the hyper-Zagreb index, the refined Zagreb index, the Bell index, the min-deg index, the max-deg index, the symmetric division index, the harmonic index, the inverse sum indeg index, the M-polynomial and the Zagreb polynomial
There is a very wide application of mathematics in communication theory, signal processing and netwo...
Let G=VG,EG be a molecular graph, where VG and EG are the sets of vertices (atoms) and edges (bonds)...
Abstract. The Wiener index is one of the oldest graph parameter which is used to study molecular-gra...
We determine some classical distance-based and degree-based topological indices of the connected ant...
Topological indices, i.e., numerical invariants suitably associated to graphs and only depending up...
In chemical graph theory, distance-degree-based topological indices are expressions of the form u =v...
In mathematical chemistry, a topological index is a molecular descriptor that is calculated based on...
: In this article, we have examined the Wiener index in neutrosophic graphs. Wiener index is one of ...
Abstract Inequalities provide a way to study topological indices relatively. There are two major cla...
AbstractWe study distance-based graph invariants, such as the Wiener index, the Szeged index, and va...
Topological indices are graph invariants determined by the distance or degree of vertices of the mol...
A topological index is a numeric number that helps to find the characteristics of compounds. There ...
Topological indices are numbers that are applied to a graph and can be used to describe specific gra...
It is one of the core problems in the study of chemical graph theory to study the topological index ...
This is the first book to focus on the topological index, the Harary index, of a graph, including it...
There is a very wide application of mathematics in communication theory, signal processing and netwo...
Let G=VG,EG be a molecular graph, where VG and EG are the sets of vertices (atoms) and edges (bonds)...
Abstract. The Wiener index is one of the oldest graph parameter which is used to study molecular-gra...
We determine some classical distance-based and degree-based topological indices of the connected ant...
Topological indices, i.e., numerical invariants suitably associated to graphs and only depending up...
In chemical graph theory, distance-degree-based topological indices are expressions of the form u =v...
In mathematical chemistry, a topological index is a molecular descriptor that is calculated based on...
: In this article, we have examined the Wiener index in neutrosophic graphs. Wiener index is one of ...
Abstract Inequalities provide a way to study topological indices relatively. There are two major cla...
AbstractWe study distance-based graph invariants, such as the Wiener index, the Szeged index, and va...
Topological indices are graph invariants determined by the distance or degree of vertices of the mol...
A topological index is a numeric number that helps to find the characteristics of compounds. There ...
Topological indices are numbers that are applied to a graph and can be used to describe specific gra...
It is one of the core problems in the study of chemical graph theory to study the topological index ...
This is the first book to focus on the topological index, the Harary index, of a graph, including it...
There is a very wide application of mathematics in communication theory, signal processing and netwo...
Let G=VG,EG be a molecular graph, where VG and EG are the sets of vertices (atoms) and edges (bonds)...
Abstract. The Wiener index is one of the oldest graph parameter which is used to study molecular-gra...