Noncentral convergence of multiple integrals
Abstract
Fix >0, denote by G(/2) a Gamma random variable with parameter /2 and let n≥2 be a fixed even integer. Consider a sequence \Fk\k≥1 of square integrable random variables belonging to the nth Wiener chaos of a given Gaussian process and with variance converging to 2. As k∞, we prove that Fk converges in distribution to 2G(/2)- if and only if E(Fk4)-12E(Fk3)122-48.
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