Subsequential scaling limits for Liouville graph distance
Abstract
For 0<γ<2 and δ>0, we consider the Liouville graph distance, which is the minimal number of Euclidean balls of γ-Liouville quantum gravity measure at most δ whose union contains a continuous path between two endpoints. In this paper, we show that the renormalized distance is tight and thus has subsequential scaling limits at δ 0. In particular, we show that for all δ>0 the diameter with respect to the Liouville graph distance has the same order as the typical distance between two endpoints.
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