The maximum relaxation time of a random walk
Abstract
We show the minimum spectral gap of the normalized Laplacian over all simple, connected graphs on n vertices is (1+o(1))54n3. This minimum is achieved asymptotically by a double kite graph. Consequently, this leads to sharp upper bounds for the maximum relaxation time of a random walk, settling a conjecture of Aldous and Fill. We also improve an eigenvalue-diameter inequality by giving a new lower bound for the spectral gap of the normalized Laplacian. This eigenvalue lower bound is asymptotically best possible.
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