Mixing time for the random walk on the range of the random walk on tori
Abstract
Consider the subgraph of the discrete d-dimensional torus of size length N, d3, induced by the range of the simple random walk on the torus run until the time uNd. We prove that for all d 3 and u>0, the mixing time for the random walk on this subgraph is of order N2 with probability at least 1 - Ce-( N)2.
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