Saieed Akbari, Ebrahim Ghorbani
Published 2007-12-06Version 1
The energy of a graph G, denoted by E(G), is defined as the sum of the absolute values of all eigenvalues of G. It is proved that E(G)>= 2(n-\chi(\bar{G}))>= 2(ch(G)-1) for every graph G of order n, and that E(G)>= 2ch(G) for all graphs G except for those in a few specified families, where \bar{G}, \chi(G), and ch(G) are the complement, the chromatic number, and the choice number of G, respectively.
Comments: to appear in Linear Algebra and its Applications
Some Relations between Rank, Chromatic Number and Energy of Graphs
The choice number versus the chromatic number for graphs embeddable on orientable surfaces
Beyond Ohba's Conjecture: A bound on the choice number of $k$-chromatic graphs with $n$ vertices
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