Exponential tail bounds for loop-erased random walk in two dimensions

Abstract

Let Mn be the number of steps of the loop-erasure of a simple random walk on Z2 from the origin to the circle of radius n. We relate the moments of Mn to Es(n), the probability that a random walk and an independent loop-erased random walk both started at the origin do not intersect up to leaving the ball of radius n. This allows us to show that there exists C such that for all n and all k=1,2,...,E[Mnk]≤ Ckk!E[Mn]k and hence to establish exponential moment bounds for Mn. This implies that there exists c>0 such that for all n and all λ≥0, \[P\Mn>λE[Mn]\≤2e-cλ.\] Using similar techniques, we then establish a second moment result for a specific conditioned random walk which enables us to prove that for any α<4/5, there exist C and c'>0 such that for all n and λ>0, \[P\Mn<λ-1E[Mn]\≤ Ce-c'λ α.\]