Limiting distribution of visits of sereval rotations to shrinking intervals
Abstract
We show that given n normalized intervals on the unit circle, the numbers of visits of d random rotations to these intervals have a joint limiting distribution as lengths of trajectories tend to infinity. If d then tends to infinity, then the numbers of points in different intervals become asymptotically independent unless an arithmetic obstruction arises. This is a generalization of earlier results of J. Marklof.
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