We give sharp lower bounds for the Zagreb eccentricity indices of connected graphs with fixed numbers of vertices and edges, sharp lower and upper bounds for the Zagreb eccentricity indices of trees with fixed number of pendant vertices, sharp upper bounds for the Zagreb eccentricity indices of trees with fixed matching number (fixed maximum degree, respectively), and characterize the extremal graphs. (doi: 10.5562/cca2020
AbstractThe first Zagreb index M1(G) and the second Zagreb index M2(G) of a (molecular) graph G are ...
AbstractFor a (molecular) graph, the first Zagreb index M1 is equal to the sum of the squares of the...
The connectivity index w�(G) of a graph G is the sum of the weights (d(u)d(v)) � of all edges uv of...
We give sharp lower bounds for the Zagreb eccentricity indices of connected graphs with fixed number...
The Zagreb eccentricity indices are the eccentricity version of the classical Zagreb indices. The fi...
For a (molecular) graph G, the first and the second entire Zagreb indices are defined by the formula...
Chemical indices are introduced to correlate chemical compounds\u27 physical properties with their s...
The Zagreb eccentricity indices are the eccentricity reformulation of the Zagreb indices. Let H ...
The hyper-Zagreb index is an important branch in the Zagreb indices family, which is defined as ∑uv∈...
In this paper, we introduce the first and second distance eccentricity Zagreb indices of a connected...
The reformulated Zagreb indices of a graph are obtained from the original Zagreb indices by replacin...
AbstractThe first and second reformulated Zagreb indices are defined respectively in terms of edge-d...
In this article, we investigate several issues related to the use of the index S(G), known as the Z...
AbstractThe eccentricity of a vertex is the maximum distance from it to another vertex and the avera...
The eccentric connectivity index, proposed by Sharma, Goswami and Madan, has been employed successfu...
AbstractThe first Zagreb index M1(G) and the second Zagreb index M2(G) of a (molecular) graph G are ...
AbstractFor a (molecular) graph, the first Zagreb index M1 is equal to the sum of the squares of the...
The connectivity index w�(G) of a graph G is the sum of the weights (d(u)d(v)) � of all edges uv of...
We give sharp lower bounds for the Zagreb eccentricity indices of connected graphs with fixed number...
The Zagreb eccentricity indices are the eccentricity version of the classical Zagreb indices. The fi...
For a (molecular) graph G, the first and the second entire Zagreb indices are defined by the formula...
Chemical indices are introduced to correlate chemical compounds\u27 physical properties with their s...
The Zagreb eccentricity indices are the eccentricity reformulation of the Zagreb indices. Let H ...
The hyper-Zagreb index is an important branch in the Zagreb indices family, which is defined as ∑uv∈...
In this paper, we introduce the first and second distance eccentricity Zagreb indices of a connected...
The reformulated Zagreb indices of a graph are obtained from the original Zagreb indices by replacin...
AbstractThe first and second reformulated Zagreb indices are defined respectively in terms of edge-d...
In this article, we investigate several issues related to the use of the index S(G), known as the Z...
AbstractThe eccentricity of a vertex is the maximum distance from it to another vertex and the avera...
The eccentric connectivity index, proposed by Sharma, Goswami and Madan, has been employed successfu...
AbstractThe first Zagreb index M1(G) and the second Zagreb index M2(G) of a (molecular) graph G are ...
AbstractFor a (molecular) graph, the first Zagreb index M1 is equal to the sum of the squares of the...
The connectivity index w�(G) of a graph G is the sum of the weights (d(u)d(v)) � of all edges uv of...