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Persistence of heavy-tailed sample averages: principle of infinitely many big jumps

Published 26 Feb 2019 in math.PR | (1902.09922v3)

Abstract: We consider the sample average of a centered random walk in $\mathbb{R}d$ with regularly varying step size distribution. For the first exit time from a compact convex set $A$ not containing the origin, we show that its tail is of lognormal type. Moreover, we show that the typical way for a large exit time to occur is by having a number of jumps growing logarithmically in the scaling parameter.

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