Density convergence in the Breuer-Major theorem for Gaussian stationary sequences
Abstract
Consider a Gaussian stationary sequence with unit variance X=\Xk;k∈ N\0\\. Assume that the central limit theorem holds for a weighted sum of the form Vn=n-1/2Σn-1k=0f(Xk), where f designates a finite sum of Hermite polynomials. Then we prove that the uniform convergence of the density of Vn towards the standard Gaussian density also holds true, under a mild additional assumption involving the causal representation of X.
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