The distance exponent for Liouville first passage percolation is positive

Abstract

Discrete Liouville first passage percolation (LFPP) with parameter > 0 is the random metric on a sub-graph of Z2 obtained by assigning each vertex z a weight of e h(z), where h is the discrete Gaussian free field. We show that the distance exponent for discrete LFPP is strictly positive for all > 0. More precisely, the discrete LFPP distance between the inner and outer boundaries of a discrete annulus of size 2n is typically at least 2α n for an exponent α > 0 depending on . This is a crucial input in the proof that LFPP admits non-trivial subsequential scaling limits for all > 0 and also has theoretical implications for the study of distances in Liouville quantum gravity.