On the shape of the connected components of the complement of two-dimensional Brownian random interlacements
Abstract
We study the limiting shape of the connected components of the vacant set of two-dimensional Brownian random interlacements: we prove that the connected component around x is close in distribution to a rescaled Brownian amoeba in the regime when the distance from x∈C to the closest trajectory is small (which, in particular, includes the cases x∞ with fixed intensity parameter α, and α∞ with fixed x). We also obtain a new family of martingales built on the conditioned Brownian motion, which may be of independent interest.
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