Stochastic Loewner evolution in multiply connected domains
Abstract
We construct radial stochastic Loewner evolution in multiply connected domains, choosing the unit disk with concentric circular slits as a family of standard domains. The natural driving function or input is a diffusion on the associated Teichm\"uller space. The diffusion stops when it reaches the boundary of the Teichm\"uller space. We show that for this driving function the family of random growing compacts has a phase transition for =4 and =8, and that it satisfies locality for =6.
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