On the Wiener polarity index of graphs
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Publication:671141
DOI10.1016/j.amc.2016.01.043zbMath1410.05045OpenAlexW2270603402MaRDI QIDQ671141
Kinkar Chandra Das, Hong-Bo Hua
Publication date: 20 March 2019
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2016.01.043
diameterindependence numberHosoya indexWiener polarity indexNordhaus-Gaddum-type inequalitythe Zagreb indices
Related Items (14)
On degree based topological indices of bridge graphs ⋮ Towards the solution of an extremal problem concerning the Wiener polarity index of alkanes ⋮ Hyper-Wiener and Wiener polarity indices of silicate and oxide frameworks ⋮ A note on the minimum Wiener polarity index of trees with a given number of vertices and segments or branching vertices ⋮ Relationships between some distance-based topological indices ⋮ Further results on the Merrifield-Simmons index ⋮ On min–max distance degree index ⋮ On conjecture of Merrifield-Simmons index ⋮ Formula for calculating the Wiener polarity index with applications to benzenoid graphs and phenylenes ⋮ Ordering chemical trees by Wiener polarity index ⋮ On the generalized Wiener polarity index of trees with a given diameter ⋮ The number of independent sets in a connected graph and its complement ⋮ Analyzing lattice networks through substructures ⋮ A note on chemical trees with minimum Wiener polarity index
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