Near-existence of bigeodesics in dynamical exponential last passage percolation
Abstract
It is believed that, under very general conditions, bi-infinite geodesics (or bigeodesics) do not exist for planar first and last passage percolation (LPP) models. However, if one endows the model with a natural dynamics, thereby gradually perturbing the geometry, then it is plausible that there could exist a non-trivial set T of exceptional times at which such bigeodesics exist. For dynamical exponential LPP, we show that T is "very close" to being non-trivial; namely, we obtain an ( 1/ n) lower bound on the probability that there exists a random time t∈ [0,1] at which a non-trivial geodesic of length n passes through the origin at its midpoint; note that if the above probability were (1), then it would imply the non-triviality of T. We conjecture that, even if T≠ , it a.s. has Hausdorff dimension exactly zero.
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