Abstract
A topic of current interest in the study of topological indices is to find relations between some index and one or several relevant parameters and/or other indices. In this paper we study two general topological indices Aα and Bα, defined for each graph H=(V(H),E(H)) by Aα(H)=∑ij∈E(H)f(di,dj)α and Bα(H)=∑i∈V(H)h(di)α, where di denotes the degree of the vertex i and α is any real number. Many important topological indices can be obtained from Aα and Bα by choosing appropriate symmetric functions and values of α. This new framework provides new tools that allow to obtain in a unified way inequalities involving many different topological indices. In particular, we obtain new optimal bounds on the variable Zagreb indices, the variable sum-connectivity index, the variable geometric-arithmetic index and the variable inverse sum indeg index. Thus, our approach provides both new tools for the study of topological indices and new bounds for a large class of topological indices. We obtain several optimal bounds of Aα (respectively, Bα) involving Aβ (respectively, Bβ). Moreover, we provide several bounds of the variable geometric-arithmetic index in terms of the variable inverse sum indeg index, and two bounds of the variable inverse sum indeg index in terms of the variable second Zagreb and the variable sum-connectivity indices.
Highlights
Chemical compounds can be represented by means of graphs.A topological descriptor is a numerical value that encapsulates some property of that graph
The previous theorem shows some mathematical relationships for the general variable index Aα
Motivated by the studies [12,15], the introduction of a new general index Aα was deemed convenient by the authors
Summary
Chemical compounds (like hydrocarbons) can be represented by means of graphs. A topological descriptor is a numerical value (or a set of numerical values) that encapsulates some property of that graph. A turning point in the mathematical examination of topological indices happened in the second half of the 1990s, when a significant and ever growing research field on this matter started, resulting in numerous publications. In this context, especially the papers of Erdös [7,8] should be mentioned. Note that ∑ij∈E( H ) (di + d j ) = ∑i∈V ( H ) d2i , χ1 is the first Zagreb index M1 , 2χ−1 is the harmonic index H (see [24,25,26,27,28]), etc Some relations connecting these indices are reported in [26]. Note that ISI1 ( H ) is the standard inverse sum indeg index ISI ( H )
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