Nonconventional limit theorems in averaging
Abstract
We consider "nonconventional" averaging setup in the form dXε(t)dt=ε B(Xε(t),(q1(t)), (q2(t)),...,(q(t))) where (t),t≥ 0 is either a stochastic process or a dynamical system (i.e. then (t)=Ftx) with sufficiently fast mixing while qj(t)=jt,\,1<2<...<k and qj,\, j=k+1,..., grow faster than linearly. We show that the properly normalized error term in the "nonconventional" averaging principle is asymptotically Gaussian.
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