Hsu–Robbins–Erdős theorem
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.[1] Hsu and Robbins further conjectured in [2] 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.[3]
Since then, many authors extended this result in several directions.[4]
References[]
- ^ Chung, K. L. (1979). Hsu's work in probability. The Annals of Statistics, 479–483.
- ^ Hsu, P. L., & Robbins, H. (1947). Complete convergence and the law of large numbers. Proceedings of the National Academy of Sciences of the United States of America, 33(2), 25.
- ^ Erdos, P. (1949). On a theorem of Hsu and Robbins. The Annals of Mathematical Statistics, 286–291.
- ^ Hsu-Robbins theorem for the correlated sequences
- Theorems in measure theory
- Probabilistic inequalities