Moderate Deviation Principle for a Stochastic Approximation Process
Abstract
In this paper, we investigate a stochastic approximation procedure (Xn)n 0 taking values in R. The process is adapted to a filtration (Fn)n 0 and satisfies the recursion Xn+1=Xn+bn+1[g(Xn)+Un+1], where b>0, g:R R is a function and (Un)n 1 is a sequence of bounded martingale differences adapted to the filtration (Fn)n 1. We establish the moderate deviation principle for the stochastic process (Xn)n 0. As auxiliary results, we also obtain the exponential inequality for (Xn)n 0 and the moderate deviation principle for weighted sums of bounded martingale differences.
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