Capacity of the range of branching random walks in low dimensions
Abstract
Consider a branching random walk (Vu)u∈ TIGW in Zd with the genealogy tree TIGW formed by a sequence of i.i.d. critical Galton-Watson trees. Let Rn be the set of points in Zd visited by (Vu) when the index u explores the first n subtrees in TIGW. Our main result states that for d∈ \3, 4, 5\, the capacity of Rn is almost surely equal to nd-22+o(1) as n ∞.
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