Largest projections for random walks and shortest curves in random mapping tori
Abstract
We show that the largest subsurface projection distance between a marking and its image under the nth step of a random walk grows logarithmically in n, with probability approaching 1 as n tends to infinity. Our setup is general and also applies to (relatively) hyperbolic groups and to Out(Fn). We then use this result to prove Rivin's conjecture that for a random walk (wn) on the mapping class group, the shortest geodesic in the hyperbolic mapping torus Mwn has length on the order of 1/ 2(n).
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