<P><B>Abstract</B></P> <P>In a network or a graph, the total communicability (<I>TC</I>) has been defined as the sum of the entries in the exponential of the adjacency matrix of the network. This quantity off...
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https://www.riss.kr/link?id=A107450024
2019
-
SCI,SCIE,SCOPUS
학술저널
266-284(19쪽)
0
상세조회0
다운로드다국어 초록 (Multilingual Abstract)
<P><B>Abstract</B></P> <P>In a network or a graph, the total communicability (<I>TC</I>) has been defined as the sum of the entries in the exponential of the adjacency matrix of the network. This quantity off...
<P><B>Abstract</B></P> <P>In a network or a graph, the total communicability (<I>TC</I>) has been defined as the sum of the entries in the exponential of the adjacency matrix of the network. This quantity offers a good measure of how easily information spreads across the network, and can be useful in the design of networks having certain desirable properties. In this paper, we obtain some bounds for total communicability of a graph <I>G</I>, T C ( G ) , in terms of spectral radius of the adjacency matrix, number of vertices, number of edges, minimum degree and the maximum degree of <I>G</I>. Moreover, we find some upper bounds for T C ( G ) when <I>G</I> is the Cartesian product, tensor product or the strong product of two graphs. In addition, Nordhaus–Gaddum-type results for the total communicability of a graph <I>G</I> are established.</P>
On the sum of the k largest eigenvalues of graphs and maximal energy of bipartite graphs