Conformal covariance of the Liouville quantum gravity metric for γ ∈ (0,2)

Abstract

For γ ∈ (0,2), U⊂ C, and an instance h of the Gaussian free field (GFF) on U, the γ-Liouville quantum gravity (LQG) surface associated with (U,h) is formally described by the Riemannian metric tensor eγ h (dx2 + dy2) on U. Previous work by the authors showed that one can define a canonical metric (distance function) Dh on U associated with a γ-LQG surface. We show that this metric is conformally covariant in the sense that it respects the coordinate change formula for γ-LQG surfaces. That is, if U,U are domains, φ U U is a conformal transformation, Q=2/γ+γ/2, and h = hφ-1 + Q|(φ-1)'|, then Dh(z,w) = Dh(φ(z),φ(w)) for all z,w ∈ U. This proves that Dh is intrinsic to the quantum surface structure of (U,h), i.e., it does not depend on the particular choice of parameterization.