Tightness of Liouville first passage percolation for γ ∈ (0,2)

Abstract

We study Liouville first passage percolation metrics associated to a Gaussian free field h mollified by the two-dimensional heat kernel pt in the bulk, and related star-scale invariant metrics. For γ ∈ (0,2) and = γdγ, where dγ is the Liouville quantum gravity dimension defined in [Ding-Gwynne18], we show that renormalized metrics (λt-1 e pt * h ds)t ∈ (0,1) are tight with respect to the uniform topology. In particular, we show that subsequential limits are bi-H\"older with respect to the Euclidean topology, obtain tail estimates for side-to-side distances and derive error bounds for the normalizing constants λt.