Regularity and confluence of geodesics for the supercritical Liouville quantum gravity metric

Abstract

Let h be the planar Gaussian free field and let Dh be a supercritical Liouville quantum gravity (LQG) metric associated with h. Such metrics arise as subsequential scaling limits of supercritical Liouville first passage percolation (Ding-Gwynne, 2020) and correspond to values of the matter central charge c M ∈ (1,25). We show that a.s. the boundary of each complementary connected component of a Dh-metric ball is a Jordan curve and is compact and finite-dimensional with respect to Dh. This is in contrast to the whole boundary of the Dh-metric ball, which is non-compact and infinite-dimensional with respect to Dh (Pfeffer, 2021). Using our regularity results for boundaries of complementary connected components of Dh-metric balls, we extend the confluence of geodesics results of Gwynne-Miller (2019) to the case of supercritical Liouville quantum gravity. These results show that two Dh-geodesics with the same starting point and different target points coincide for a non-trivial initial time interval.