Asymptotic Cram\'er's theorem and analysis on Wiener space
Abstract
We prove an asymptotic Cram\'er's theorem, that is, if the sequence (Xn+ Yn)n≥ 1 converges in law to the standard normal distribution and for every n≥ 1 the random variables Xn and Yn are independent, then (Xn)n≥ 1 and (Yn) n≥ 1 converge in law to a normal distribution. Then we compare this result with recent criteria for the central convergence obtained in terms of Malliavin derivatives.
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