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- Hsu–Robbins–Erdős_theorem abstract "In the mathematical theory of probability, the Hsu–Robbins–Erdős theorem states that if is a sequence of i.i.d. random variables with zero mean and finite variance and then for every .The result was proved by Pao-Lu Hsu and Herbert Robbins in 1947.This is an interesting strengthening of the classical strong law of large numbers in the direction of the Borel–Cantelli lemma. The idea of such a result is probably due to Robbins, but the method of proof is vintage Hsu. Hsu and Robbins further conjectured in that the condition of finiteness of the variance of is also a necessary condition for to hold. Two years later, the famed mathematician Paul Erdős proved the conjecture.Since then, many authors extended this result in several directions.".
- Hsu–Robbins–Erdős_theorem wikiPageID "42381742".
- Hsu–Robbins–Erdős_theorem wikiPageRevisionID "603715982".
- Hsu–Robbins–Erdős_theorem subject Category:Probability_theorems.
- Hsu–Robbins–Erdős_theorem comment "In the mathematical theory of probability, the Hsu–Robbins–Erdős theorem states that if is a sequence of i.i.d. random variables with zero mean and finite variance and then for every .The result was proved by Pao-Lu Hsu and Herbert Robbins in 1947.This is an interesting strengthening of the classical strong law of large numbers in the direction of the Borel–Cantelli lemma. The idea of such a result is probably due to Robbins, but the method of proof is vintage Hsu.".
- Hsu–Robbins–Erdős_theorem label "Hsu–Robbins–Erdős theorem".
- Hsu–Robbins–Erdős_theorem sameAs Hsu%E2%80%93Robbins%E2%80%93Erd%C5%91s_theorem.
- Hsu–Robbins–Erdős_theorem sameAs Q17027747.
- Hsu–Robbins–Erdős_theorem sameAs Q17027747.
- Hsu–Robbins–Erdős_theorem wasDerivedFrom Hsu–Robbins–Erdős_theorem?oldid=603715982.