Rate of growth of a transient cookie random walk
Abstract
We consider a one-dimensional transient cookie random walk. It is known from a previous paper that a cookie random walk (Xn) has positive or zero speed according to some positive parameter α >1 or 1. In this article, we give the exact rate of growth of (Xn) in the zero speed regime, namely: for 0<α <1, Xn/nα+12 converges in law to a Mittag-Leffler distribution whereas for α=1, Xn( n)/n converges in probability to some positive constant.
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