Some Bounds for The Weighted Energy
Abstract
Energy
of a graph is a concept defined in 1978 and originated from theoretical
chemistry. Recently, the energy, Laplacian energy, signless Laplacian energy
and normalized Laplacian energy of a graph have received much interest. In
short, for an n-vertex connected
unweighted graph G, the energy is
defined as the sum of the absolute values of the eigenvalues of its adjacency
matrix.
For
a simple connected matrix weighted graph G,
the weighted energy is defined as the sum of the absolute values of the
eigenvalues of its weighted adjacency matrix. In this paper, a brief overview
for the notations and concepts of matrix weighted and number weighted graphs
that will be used throughout this study is given. In the Main results section,
the weighted energy of simple connected matrix weighted graphs are considered
and some bounds for the weighted energy are found. Also, some results on number
weighted and unweighted graphs are obtained by means of these bounds.
Keywords: Matrix
weighted graph, number weighted graph, weighted energy, bound
Keywords
References
- 5. Horn RA, Johnson CR, 2012. Matrix analysis. 2nd ed. Cambridge/United Kingdom: Cambridge University Press, p. 225-260, 391-425.
- 4. Gutman I, Zhou B, 2006. Laplacian energy of a graph, Linear Algebra and its Applications, 414: 29–37.
- 3. Cui Z, Liu B, 2012. On Harary matrix, Harary ındex and Harary energy, MATCH Commun. Math. Comput. Chem., 68: 815-823.
- Applied Mathematical Sciences, 8(4): 193 – 198.
- 2. Binthiya R, Sarasija PB, 2014. On the signless Laplacian energy and signless Laplacian Estrada index of extremal graphs,
- 1. Anderson WN, and Morley TD, 1985. Eigenvalues of the Laplacian of a graph, Linear and Multilinear Algebra, 18(2): 141-145.
Details
Primary Language
Turkish
Subjects
-
Journal Section
Research Article
Publication Date
August 9, 2016
Submission Date
April 28, 2016
Acceptance Date
-
Published in Issue
Year 2016 Volume: 1 Number: 1
