Exact Lower Bounds on the Exponential Moments of Truncated Random Variables-Reference-Cited by-同舟云学术

Exact Lower Bounds on the Exponential Moments of Truncated Random Variables

Published:2011-06 Issue:2 Volume:48 Page:547-560
ISSN:0021-9002
Container-title:Journal of Applied Probability
language:en
Short-container-title:Journal of Applied Probability

Author:

Pinelis Iosif

Abstract

Exact lower bounds on the exponential moments of min(y, X) and X1{X < y} are provided given the first two moments of a random variable X. These bounds are useful in work on large deviation probabilities and nonuniform Berry-Esseen bounds, when the Cramér tilt transform may be employed. Asymptotic properties of these lower bounds are presented. Comparative advantages of the so-called Winsorization min(y, X) over the truncation X1{X < y} are demonstrated. An application to option pricing is given.

Publisher

Cambridge University Press (CUP)

Subject

Statistics, Probability and Uncertainty,General Mathematics,Statistics and Probability

Reference27 articles.

1. Exact norms of a Stein-type operator and associated stochastic orderings

2. Fractional sums and integrals of 𝑟-concave tails and applications to comparison probability inequalities

3. A Note on Symmetric Bernoulli Random Variables

4. Option Prices and the Underlying Asset's Return Distribution

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