随机变量乘积的切比雪夫不等式

Chebyshev Inequalities for Products of Random Variables

Mathematics of Operations Research · 2018
被引 18
ABS 3

中文导读

利用对称非负随机变量的前两阶矩信息,推导其乘积尾部概率的精确上界,并给出协方差矩阵已知或仅有上界时的计算方法。

Abstract

We derive sharp probability bounds on the tails of a product of symmetric nonnegative random variables using only information about their first two moments. If the covariance matrix of the random variables is known exactly, these bounds can be computed numerically using semidefinite programming. If only an upper bound on the covariance matrix is available, the probability bounds on the right tails can be evaluated analytically. The bounds under precise and imprecise covariance information coincide for all left tails as well as for all right tails corresponding to quantiles that are either sufficiently small or sufficiently large. We also prove that all left probability bounds reduce to the trivial bound 1 if the number of random variables in the product exceeds an explicit threshold. Thus, in the worst case, the weak-sense geometric random walk defined through the running product of the random variables is absorbed at 0 with certainty as soon as time exceeds the given threshold. The techniques devised for constructing Chebyshev bounds for products can also be used to derive Chebyshev bounds for sums, maxima, and minima of nonnegative random variables.

概率论数理统计随机过程优化理论