The vacant set of two-dimensional critical random interlacement is infinite
Abstract
For the model of two-dimensional random interlacements in the critical regime (i.e., α=1), we prove that the vacant set is a.s.\ infinite, thus solving an open problem from arXiv:1502.03470. Also, we prove that the entrance measure of simple random walk on annular domains has certain regularity properties; this result is useful when dealing with soft local times for excursion processes.
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