Bounds on the weighted vertex PI index of cacti graphs
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Publication:5864397
DOI10.2298/FIL1918977MzbMath1499.05141OpenAlexW3002741190WikidataQ126305767 ScholiaQ126305767MaRDI QIDQ5864397
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Publication date: 7 June 2022
Published in: Filomat (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2298/fil1918977m
Distance in graphs (05C12) Graphical indices (Wiener index, Zagreb index, Randi? index, etc.) (05C09)
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Cites Work
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- Correction of the paper ``Bicyclic graphs with extremal values of PI index
- On weighted PI index of graphs
- Wiener and vertex \(PI\) indices of Kronecker products of graphs
- Vertex PI indices of four sums of graphs
- The matching energy of a graph
- Extremal graphs with respect to the vertex PI index
- The PI index of product graphs
- Vertex and edge PI indices of Cartesian product graphs
- A matrix method for computing Szeged and vertex PI indices of join and composition of graphs
- The vertex PI index and Szeged index of bridge graphs
- Relationships and relative correlation potential of the Wiener, Szeged and PI indices
- Wiener index of hexagonal systems
- The weighted vertex PI index of bicyclic graphs
- The maximum PI index of bicyclic graphs with even number of edges
- Bicyclic graphs with extremal values of PI index
- The weighted vertex PI index of \((n,m)\)-graphs with given diameter
- The weighted vertex PI index
- The maximum hyper-Wiener index of cacti
- Bounds on the PI index of unicyclic and bicyclic graphs with given girth
- Wiener and vertex PI indices of the strong product of graphs
- Weighted PI index of corona product of graphs
- Cacti with extremal PI Index
- Bound for vertex PI index in terms of simple graph parameters
- Sharp bounds on Zagreb indices of cacti with k pendant vertices
- Wiener index of trees: Theory and applications
- Cacti with the smallest, second smallest, and third smallest Gutman index
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