140 research outputs found
The quotients between the (revised) Szeged index and Wiener index of graphs
Let and be the Szeged index, revised Szeged index and
Wiener index of a graph In this paper, the graphs with the fourth, fifth,
sixth and seventh largest Wiener indices among all unicyclic graphs of order
are characterized; as well the graphs with the first, second,
third, and fourth largest Wiener indices among all bicyclic graphs are
identified. Based on these results, further relation on the quotients between
the (revised) Szeged index and the Wiener index are studied. Sharp lower bound
on is determined for all connected graphs each of which contains
at least one non-complete block. As well the connected graph with the second
smallest value on is identified for containing at least one
cycle.Comment: 25 pages, 5 figure
The Vertex Version of Weighted Wiener Number for Bicyclic Molecular Structures
Graphs are used to model chemical compounds and drugs. In the graphs, each vertex represents an atom of molecule and edges between the corresponding vertices are used to represent covalent bounds between atoms. We call such a graph, which is derived from a chemical compound, a molecular graph. Evidence shows that the vertex-weighted Wiener number, which is defined over this molecular graph, is strongly correlated to both the melting point and boiling point of the compounds. In this paper, we report the extremal vertex-weighted Wiener number of bicyclic molecular graph in terms of molecular structural analysis and graph transformations. The promising prospects of the application for the chemical and pharmacy engineering are illustrated by theoretical results achieved in this paper
On Topological Indices And Domination Numbers Of Graphs
Topological indices and dominating problems are popular topics in Graph Theory. There are various topological indices such as degree-based topological indices, distance-based topological indices and counting related topological indices et al. These topological indices correlate certain physicochemical properties such as boiling point, stability of chemical compounds. The concepts of domination number and independent domination number, introduced from the mid-1860s, are very fundamental in Graph Theory. In this dissertation, we provide new theoretical results on these two topics. We study k-trees and cactus graphs with the sharp upper and lower bounds of the degree-based topological indices(Multiplicative Zagreb indices). The extremal cacti with a distance-based topological index (PI index) are explored. Furthermore, we provide the extremal graphs with these corresponding topological indices. We establish and verify a proposed conjecture for the relationship between the domination number and independent domination number. The corresponding counterexamples and the graphs achieving the extremal bounds are given as well
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