The random walk penalised by its range in dimensions d≥ 3
Abstract
We study a self-attractive random walk such that each trajectory of length N is penalised by a factor proportional to ( - |RN|), where RN is the set of sites visited by the walk. We show that the range of such a walk is close to a solid Euclidean ball of radius approximately d N1/(d+2), for some explicit constant d >0. This proves a conjecture of Bolthausen who obtained this result in the case d=2.
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