Probability and Mathematical Statistics: Vol. 6, Fasc. 2

ON SOME CRITERION OF CONVERGENCE IN PROBABILITY

Wiesław Zięba

Abstract: Let $(_O_,A,P )$ be a probability space. $(S,r)$ denotes a metric space, and $B$ stands for the $s$ -field generated by open sets of $S.$ The set $S$ is assumed to be a separable and complete space. A sequence $(X ,n > 1) n$ of random elements, defined on a probability space $(_O_, A,P )$ taking values in $S,$ is called $stable$ if for every $B (- A,$ with $P(B) > 0,$ there exists a probability measure $m B$ such that

lim P ([X (- A]| B) = m (A). n--> oo n B

There are given conditions concerning the set $PA(S) = (mB,B (- A)$ of probability measures, under which there exists a random element $X$ such that the sequence $(Xn, n > 1)$ of random elements converges in probability to $X.$

2000 AMS Mathematics Subject Classification: Primary: -; Secondary: -;

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