We characterize the possible weak limits of [Formula} for a sequence {єn,n ≥ 1} of independent random variables [Formula] and a non-random variables (P[єn Є {0,1}] = 1 for n ≥ 1) and a non-random normalizing sequence {kn,n ≥ 1} of positive reals. We consider two cases: when {Xn, n ≥ 1} and {єn, n ≥ 1} are independent or dependent. In the first case we obtain results generalizing transfer theorems, whereas in the other case, only a partial characterization was possible.
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We consider three new schemes of random splitting of a unit interval.These schemes are related to settings considered earlier in literature. Essentially we are concerned with asymptotic behavior of sequences of subdivisions. In all three cases almost sure or weak limits are obtained for a sequence of points of divisions. The two of the schemes considered are dual to each other in the sense of the contraction principle of Chamayou and Letac [2].
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