Cram\'er's moderate deviations for martingales with applications
Abstract
Let (i,Fi)i≥1 be a sequence of martingale differences. Set Xn=Σi=1n i and X n=Σi=1n E(i2|Fi-1). We prove Cram\'er's moderate deviation expansions for P(Xn/ Xn ≥ x) and P(Xn/ EXn2 ≥ x) as n∞. Our results extend the classical Cram\'er result to the cases of normalized martingales Xn/ Xn and standardized martingales Xn/ EXn2, with martingale differences satisfying the conditional Bernstein condition. Applications to elephant random walks and autoregressive processes are also discussed.
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