Iterated Ergodic Theorems and Erd\" os--R\' enyi law of large numbers
Abstract
We obtain ergodic theorems for multiple iterated sums and integrals of the form ()(t)=Σ0≤ k1<...<k≤ t(k1)·s(k), t∈[0,T] and ()(t)=∫0≤ s1≤...≤ s≤ t(s1)·s(s)ds1·s ds where \(k)\-∞<k<∞ and \(s)\-∞<s<∞ are vector processes for which standard ergodic theorems, i.e. when =1, hold true. At the end we prove also a version of the Erd\" os--R\" enyi law of large numbers for iterated sums and integrals.
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