Abstract
Let be zero mean, mean-square continuous, stationary, Gaussian random field with covariance function and let such that G is square integrable with respect to the standard Gaussian measure and is of Hermite rank d. The Breuer-Major theorem in it’s continuous setting gives that, if then the finite dimensional distributions of converge to that of a scaled Brownian motion as Here we give a proof for the case when is a random vector field. We also give a proof for the functional convergence in of Zs to hold under the condition that for some p > 2, where γm denotes the standard Gaussian measure on and we derive expressions for the asymptotic variance of the second chaos component in the Wiener chaos expansion of
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