On strong convergence of arrays

Yong-Cheng Qi

doi:10.1017/S000497270001368X

Abstract

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In this paper we study almost sure convergence for arrays of independent and identically distributed random variables. We obtain a condition under which Marcinkiewicz's strong law holds and get a rate analogous to the law of the iterated logarithm under a condition weaker than Hu and Weber's.

References

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On strong convergence of arrays

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