We study random towers that are suitable to analyse the statistics of slowly mixing random systems. We obtain upper bounds on the rate of quenched correlation decay in a general setting. We apply our results to the random family of LiveraniSaussol-Vaienti maps with parameters in [α0, α1] ⊂ (0, 1) chosen independently with respect to a distribution ν on [α0, α1] and show that the quenched decay of correlation is governed by the fastest mixing map in the family. In particular, we prove that for every δ > 0, for almost every ω ∈ [α0, α1] Z, the upper bound n 1− 1 α0 +δ holds on the rate of decay of correlation for Holder observables on the fibre over ¨ ω. For three different distributions ν on [α0, α1] (discrete, uniform, quadratic), we also d...
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