Title of article
Extremal Chemical Trees for a Modified Version of Sombor Index
Author/Authors
Buyantogtokh ، Lkhagva Department of Mathematics - Mongolian National University of Education , Horoldagva ، Batmend Department of Mathematics - Mongolian National University of Education , Dorjsembe ، Shiikhar Department of Mathematics - Mongolian National University of Education , Azjargal ، Enkhbayar Department of Mathematics - Mongolian National University of Education
From page
259
To page
268
Abstract
Let G be a molecular graph, where du representes the degree of vertex u, and uv denotes an edge connecting vertices u and v. A few years ago, a new vertex-degree-based graph invariant (topological index) was introduced by Gutman, defined as SO(G) = ∑ uv∈E √ d²u + d²v, called the Sombor index. Recently, Kulli et al. compared several modified versions of Sombor in dex (Nirmala, Sombor, Dharwad, and F-Sombor indices), they found that these indices are highly correlated and their values for QSPR applications are nearly the same. Based on this study Kulli et al. introduced a new vertex-degree-based topological in dex, which is defined as X(G) = ∑ uv∈E √ d k u + d k v, where k ≥ 1 is a real number. In this paper, we determine the extremal chemical trees with respect to X index.
Keywords
Sombor index , Nirmala index , Dharwad index , F , Sombor index , Chemical tree
Journal title
Iranian Journal of Mathematical Chemistry
Journal title
Iranian Journal of Mathematical Chemistry
Record number
2775058
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