A Nordhaus--Gaddum problem for the spectral gap of a graph

Abstract

Let G be a graph on n vertices, with complement G. The spectral gap of the transition probability matrix of a random walk on G is used to estimate how fast the random walk becomes stationary. We prove that the larger spectral gap of G and G is (1/n). Moreover, if all degrees are (n) and n-(n), then the larger spectral gap of G and G is (1). We also show that if the maximum degree is n-O(1) or if G is a join of two graphs, then the spectral gap of G is (1/n). Finally, we provide a family of connected graphs with connected complements such that the larger spectral gap of G and G is O(1/n3/4).

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