On the general sum-connectivity index of trees with given number of pendent vertices
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Publication:1786888
DOI10.1016/j.dam.2017.01.016zbMath1396.05058OpenAlexW2586802053MaRDI QIDQ1786888
Publication date: 25 September 2018
Published in: Discrete Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.dam.2017.01.016
Trees (05C05) Applications of graph theory (05C90) Molecular structure (graph-theoretic methods, methods of differential topology, etc.) (92E10) Connectivity (05C40)
Related Items (13)
A note on polyomino chains with extremum general sum-connectivity index ⋮ On General Sum-Connectivity Index of Trees of Fixed Maximum Degree and Order ⋮ General Randić Index of Unicyclic Graphs With Given Number of Pendant Vertices ⋮ General sum-connectivity index of trees with given number of branching vertices ⋮ General sum-connectivity index of unicyclic graphs with given diameter and girth ⋮ General multiplicative Zagreb indices of trees ⋮ On the extremal graphs with respect to bond incident degree indices ⋮ On the extremal graphs for general sum-connectivity index \((\chi_{{}_\alpha})\) with given cyclomatic number when \(\alpha > 1\) ⋮ General Randić index of unicyclic graphs with given diameter ⋮ Cacti with maximal general sum-connectivity index ⋮ The minimum general sum-connectivity index of trees with given matching number ⋮ Two-tree graphs with maximum general sum-connectivity index ⋮ General Randić index of unicyclic graphs with given girth and diameter
Uses Software
Cites Work
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