Recurrence and transience of symmetric random walks with long-range jumps

Abstract

Let X1, X2, … be i.i.d. random variables with values in Zd satisfying P (X1=x) = P (X1=-x) = (\|x\|-s) for some s>d. We show that the random walk defined by Sn = Σk=1n Xk is recurrent for d∈ \1,2\ and s ≥ 2d, and transient otherwise. This also shows that for an electric network in dimension d∈ \1,2\ the condition c\x,y\ ≤ C \|x-y\|-2d implies recurrence, whereas c\x,y\ ≥ c \|x-y\|-s for some c>0 and s<2d implies transience. This fact was already previously known, but we give a new proof of it that uses only electric networks. We also use these results to show the recurrence of random walks on certain long-range percolation clusters. In particular, we show recurrence for several cases of the two-dimensional weight-dependent random connection model, which was previously studied by Gracar et al. [Electron. J. Probab. 27. 1-31 (2022)].