Eccentricity and algebraic connectivity of graphs

Abstract

Let G be a graph on n nodes with algebraic connectivity λ2. The eccentricity of a node is defined as the length of a longest shortest path starting at that node. If s denotes the number of nodes of eccentricity at most , then for 2, λ2 4 \, s (-2+4n) \, n2 . As a corollary, if d denotes the diameter of G, then λ2 4 (d-2+4n) \, n . It is also shown that λ2 s 1+ (e(G)-m) , where m and e(G) denote the number of edges in G and in the -th power of G , respectively.

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