Phase transition for the late points of random walk

Abstract

Let X be a random walk on the torus of side length N in dimension d≥ 3 with uniform starting point, and tcov be the expected value of its cover time, which is the first time that X has visited every vertex of the torus at least once. For α > 0, the set Lα of α-late points consists of those points not visited by X at time α tcov. We prove the existence of a value α* ∈ (12,1) across which Lα trivialises as follows: for all α > α* and ε≥ N-c there exists a coupling of Lα and two occupation sets Bα of i.i.d. Bernoulli fields having the same density as Lα ε, which is asymptotic to N-(αε)d, with the property that the inclusion Bα+ ⊂eq Lα ⊂eq Bα- holds with high probability as N ∞. On the contrary, when α ≤ α* there is no such coupling. Corresponding results also hold for the vacant set of random interlacements at high intensities. The transition at α* corresponds to the (dis-)appearance of `double-points' (i.e. neighboring pairs of points) in Lα. We further describe the law of Lα for α>12 by adding independent patterns to Bα. In dimensions d ≥ 4 these are exactly all two-point sets. When d=3 one must also include all connected three-point sets, but no other.