Add to ORKGThe Kirchhoff index is defined as the sum of resistance distances between all pairs of vertices in a graph. This index is a critical parameter for measuring graph structures. In this paper, we characterize polygonal chains with the minimum Kirchhoff index, and characterize even (odd) polygonal chains with the maximum Kirchhoff index, which extends the results of \cite{45}, \cite{14} and \cite{2,13,44} to a more general case.Comment: 13 pages. arXiv admin note: substantial text overlap with arXiv:2209.1026
The resistance distance is a novel distance function on electrical network theory proposed by Klein ...
The hypercube Qn is one of the most admirable and efficient interconnection network due to its excel...
In this work we define the effective resistance between any pair of vertices with respect to a value...
Multiplicative degree-Kirchhoff index is a very interesting topological index. In this article, we c...
Abstract The Kirchhoff index of a connected graph is the sum of resistance distances between all uno...
For a graph G, the resistance distance r G ( x , y ) is defined to be the effective resi...
Abstract. The degree Kirchhoff index of a connected graph G is defined as the sum of the terms di dj...
The Kirchhoff index Kf(G) is the sum of the effective resistance distances between all pairs of vert...
Resistance distance was introduced by Klein and Randić. The Kirchhoff index Kf(G) of a graph G is th...
AbstractFor a molecular graph, the first Zagreb index M1 is equal to the sum of squares of the verte...
AbstractIn electric circuit theory, it is of great interest to compute the effective resistance betw...
Let G[F,Vk,Hv] be the graph with k pockets, where F is a simple graph of order n≥1, Vk={v1,v2,…,vk} ...
We show here that the Kirchhoff index of a network is the average of the Wiener capacities of its ve...
AbstractIn this paper, closed-form formulae for the Kirchhoff index and resistance distances of the ...
The resistance indices, namely the Kirchhoff index and its generalisations, have undergone intense c...
The resistance distance is a novel distance function on electrical network theory proposed by Klein ...
The hypercube Qn is one of the most admirable and efficient interconnection network due to its excel...
In this work we define the effective resistance between any pair of vertices with respect to a value...
Multiplicative degree-Kirchhoff index is a very interesting topological index. In this article, we c...
Abstract The Kirchhoff index of a connected graph is the sum of resistance distances between all uno...
For a graph G, the resistance distance r G ( x , y ) is defined to be the effective resi...
Abstract. The degree Kirchhoff index of a connected graph G is defined as the sum of the terms di dj...
The Kirchhoff index Kf(G) is the sum of the effective resistance distances between all pairs of vert...
Resistance distance was introduced by Klein and Randić. The Kirchhoff index Kf(G) of a graph G is th...
AbstractFor a molecular graph, the first Zagreb index M1 is equal to the sum of squares of the verte...
AbstractIn electric circuit theory, it is of great interest to compute the effective resistance betw...
Let G[F,Vk,Hv] be the graph with k pockets, where F is a simple graph of order n≥1, Vk={v1,v2,…,vk} ...
We show here that the Kirchhoff index of a network is the average of the Wiener capacities of its ve...
AbstractIn this paper, closed-form formulae for the Kirchhoff index and resistance distances of the ...
The resistance indices, namely the Kirchhoff index and its generalisations, have undergone intense c...
The resistance distance is a novel distance function on electrical network theory proposed by Klein ...
The hypercube Qn is one of the most admirable and efficient interconnection network due to its excel...
In this work we define the effective resistance between any pair of vertices with respect to a value...