Benjamini-Schramm limits of high genus translation surfaces: research announcement

Abstract

We prove that the sequence of Masur-Smillie-Veech (MSV) distributed random translation surfaces, with area equal to genus, Benjamini-Schramm converges as genus tends to infinity. This means that for any fixed radius r>0, if Xg is an MSV-distributed random translation surface with area g and genus g, and o is a uniformly random point in Xg, then the radius-r neighborhood of o in Xg, as a pointed measured metric space, converges in distribution to the radius r neighborhood of the root in a Poisson translation plane, which is a random pointed surface we introduce here. Along the way, we obtain bounds on statistical local geometric properties of translation surfaces, such as the probability that the random point o has injectivity radius at most r, which may be of independent interest.