# A generalization of a problem of Steinhaus

@article{Komlos1967AGO, title={A generalization of a problem of Steinhaus}, author={John Komlos}, journal={Acta Mathematica Academiae Scientiarum Hungarica}, year={1967}, volume={18}, pages={217-229} }

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## 293 Citations

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## References

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These notes cover the basic definitions of discrete probability theory, and then present some results including Bayes' rule, inclusion-exclusion formula, Chebyshev's inequality, and the weak law of…

of natural numbers which implies for any sequence {i,} of indices

The numbers Pk (k = 1, 2 .... ) will be chosen later. We have to choose these numbers such that for the sequence {q

and for its any subsequence would not hold the strong law of large numbers. The variables t/.'s have symmetric distribution

Probability theory (New York, 1955) p. 387

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