A confined random walk locally looks like tilted random interlacements
Abstract
In this paper we consider the simple random walk on Zd, d ≥ 3, conditioned to stay in a large domain DN of typical diameter N. Considering the range up to time tN ≥ N2+δ for some δ > 0, we establish a coupling with what Teixeira (2009) and Li & Sznitman (2014) defined as "tilted random interlacements". This tilted interlacement can be described as random interlacements but with trajectories given by random walks on conductances cN(x,y) = φN(x) φN(y), where φN is the first eigenvector of the discrete Laplace-Beltrami operator on DN. The coupling follows the methodology of the soft local times, introduced by Popov & Teixeira (2015) and used by Cern\'y & Teixeira (2016) to prove the well-known coupling between the simple random walk on the torus and the random interlacements.
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