Sharp deviation bounds for midpoint and endpoint of geodesics in exponential last passage percolation

Abstract

For exponential last passage percolation on the plane we analyse the probability that the point-to-line geodesic exhibits an atypically large transversal fluctuation at the endpoint as well as the probability that the point-to-point geodesic exhibits an atypically large transversal fluctuation at the halfway point. In particular, we show that p*n(t), the probability that the point-to-line geodesic from the origin to the line x+y=2n ends at (n-t(2n)2/3, n+t(2n)2/3) satisfies that n2/3p*n(t)=(-(43+o(1))t3) for t large and pn,12(t), the probability that the geodesic from the origin to the point (n,n) passes through the point (12n-tn2/3, 12 n+tn2/3), satisfies n2/3pn,12(t)=(-(83+o(1))t3) for t large. The latter result solves a special case of a conjecture from Liu (PTRF, 2022).

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