A Nordhaus-Gaddum type problem for the normalized Laplacian spectrum and graph Cheeger constant
Abstract
For a graph G on n vertices with normalized Laplacian eigenvalues 0 = λ1(G) ≤ λ2(G) ≤ ·s ≤ λn(G) and graph complement Gc, we prove that equation* \λ2(G),λ2(Gc)\≥ 2n2. equation* We do this by way of lower bounding \i(G), i(Gc)\ and \h(G), h(Gc)\ where i(G) and h(G) denote the isoperimetric number and Cheeger constant of G, respectively.
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