Coalescence of Geodesics in Exactly Solvable Models of Last Passage Percolation

Abstract

Coalescence of semi-infinite geodesics remains a central question in planar first passage percolation. In this paper we study finer properties of the coalescence structure of finite and semi-infinite geodesics for exactly solvable models of last passage percolation. Consider directed last passage percolation on Z2 with i.i.d. exponential weights on the vertices. Fix two points v1=(0,0) and v2=(0, k2/3 ) for some k>0, and consider the maximal paths 1 and 2 starting at v1 and v2 respectively to the point (n,n) for n k. Our object of study is the point of coalescence, i.e., the point v∈ 1 2 with smallest |v|1. We establish that the distance to coalescence |v|1 scales as k, by showing the upper tail bound P(|v|1> Rk) ≤ R-c for some c>0. We also consider the problem of coalescence for semi-infinite geodesics. For the almost surely unique semi-infinite geodesics in the direction (1,1) starting from v3=(- k2/3 , k2/3) and v4=( k2/3 ,- k2/3), we establish the optimal tail estimate P(|v|1> Rk) R-2/3, for the point of coalescence v. This answers a question left open by Pimentel (Ann. Probab., 2016) who proved the corresponding lower bound.