Conformal welding for critical Liouville quantum gravity
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Consider two critical Liouville quantum gravity surfaces (i.e., $\gamma$-LQG for $\gamma=2$), each with the topology of $\mathbb{H}$ and with infinite boundary length. We prove that there a.s. exists a conformal welding of the two surfaces, when the boundaries are identified according to quantum boundary length. This results in a critical LQG surface decorated by an independent SLE$_4$. Combined with the proof of uniqueness for such a welding, recently established by McEnteggart, Miller, and Qian (2018), this shows that the welding operation is well-defined. Our result is a critical analogue of Sheffield's quantum gravity zipper theorem (2016), which shows that a similar conformal welding for subcritical LQG (i.e., $\gamma$-LQG for $\gamma\in(0,2)$) is well-defined.
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Regularity of the SLE$_4$ uniformizing map and the SLE$_8$ trace
Modulus of continuity for SLE4 uniformizing map is (log δ^{-1})^{-1/3+o(1)}; for SLE8 trace it is (log δ^{-1})^{-1/4+o(1)} as δ→0.
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