Random Young towers and quenched decay of correlations for predominantly expanding multimodal circle maps
Abstract
In this paper, we study the random dynamical system fωn generated by a family of maps \fω0: S1 S1\ω0 ∈ [-,], fω0(x) = α (x+ω0) +a\ (mod \ 1), where : S1 R is a non-degenerated map, a∈ [0,1), and α,>0. Fixing a constant c∈ (0,1), we show that for α sufficiently large and for > α-1+c, the random dynamical system fωn presents a random Young tower structure and quenched decay of correlations.
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