A conditional strong large deviation result and a functional central limit theorem for the rate function
Abstract
We study the large deviation behaviour of Sn=Σj=1n WjZj, where (Wj)j ∈ N and (Zj)j ∈ N are sequences of real-valued, independent and identically distributed random variables satisfying certain moment conditions, independent of each other. More precisely, we prove a conditional strong large deviation result and describe the fluctuations of the random rate function through a functional central limit theorem.
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