A conditioned local limit theorem for non-negative random matrices
Abstract
Let (Sn)n be the random process on R driven by the product of i.i.d. non-negative random matrices and τ its exit time from ]0, +∞[. By using the adapted strategy initiated by D. Denisov and V. Wachtel, we obtain an asymptotic estimate and bounds of the probability that the process (Sk)k remains non negative up to time n and simultaneously belongs to some compact set [b, b+ ]⊂ R*+ at time n.
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