Random Continued fractions: L\'evy constant and Chernoff-type estimate
Abstract
Given a stochastic process \An, n ≥ 1\ taking values in natural numbers, the random continued fractions is defined as [A1, A2, ·s, An, ·s] analogue to the continued fraction expansion of real numbers. Assume that \An, n ≥ 1\ is ergodic and the expectation E( A1) < ∞, we give a L\'evy-type metric theorem which covers that of real case presented by L\'evy in 1929. Moreover, a corresponding Chernoff-type estimate is obtained under the conditions \An, n ≥ 1\ is -mixing and for each 0< t< 1, E(A1t) < ∞.
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