Stochastic recursions: between Kesten's and Grincevicius-Grey's assumptions
Abstract
We study the stochastic recursion Xn=n(Xn-1), where (n)n≥ 1 is a sequence of i.i.d. random Lipschitz mappings close to the random affine transformation x Ax+B. We describe the tail behaviour of the stationary solution X under the assumption that there exists α>0 such that E |A|α=1 and the tail of B is regularly varying with index -α<0. We also find the second order asymptotics of the tail of X when (x)=Ax+B.
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