Limit theorems for affine Markov walks conditioned to stay positive
Abstract
Consider the real Markov walk Sn = X1+ …+ Xn with increments (Xn)n≥ 1 defined by a stochastic recursion starting at X0=x. For a starting point y>0 denote by τy the exit time of the process ( y+Sn )n≥ 1 from the positive part of the real line. We investigate the asymptotic behaviour of the probability of the event τy ≥ n and of the conditional law of y+Sn given τy ≥ n as n +∞.
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