On cover times for 2D lattices
Abstract
We study the cover time τcov by (continuous-time) random walk on the 2D box of side length n with wired boundary or on the 2D torus, and show that in both cases with probability approaching 1 as n increases, τcov=2n2[2/π n + O( n)]. This improves a result of Dembo, Peres, Rosen, and Zeitouni (2004) and makes progress towards a conjecture of Bramson and Zeitouni (2009).
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