Abstract
Suppose that for every independent sequence of random variables satisfying some hypothesis condition $H$, it follows that the partial sums converge almost surely. Then it is shown that for every arbitrarily-dependent sequence of random variables, the partial sums converge almost surely on the event where the conditional distributions (given the past) satisfy precisely the same condition $H$. Thus many strong laws for independent sequences may be immediately generalized into conditional results for arbitrarily-dependent sequences.
Citation
T. P. Hill. "Conditional Generalizations of Strong Laws Which Conclude the Partial Sums Converge Almost Surely." Ann. Probab. 10 (3) 828 - 830, August, 1982. https://doi.org/10.1214/aop/1176993792
Information