More bounds on the expectation of a convex function of a random variable

Ben-Tal A.; E. Hochman

doi:10.2307/3212616

Abstract

Jensen gave a lower bound to Eρ(T), where ρ is a convex function of the random vector T. Madansky has obtained an upper bound via the theory of moment spaces of multivariate distributions. In particular, Madansky's upper bound is given explicitly when the components of T are independent random variables. For this case, lower and upper bounds are obtained in the paper, which uses additional information on T rather than its mean (mainly its expected absolute deviation about the mean) and hence gets closer to Eρ(T).

The importance of having improved bounds is illustrated through a nonlinear programming problem with stochastic objective function, known as the “wait and see” problem.

Footnotes

Research done at the Center of Research for Agricultural Economics, Rehovot.

References

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[3] Madansky, A. (1959) Bounds on the expectations of a convex function of a multivariate random variable. Ann. Math. Statist. 30, 743–746.Google Scholar

[4] Mangasarian, O. L. (1964) Nonlinear programming problems with stochastic objective functions. Management Sci. 12, 353–359.Google Scholar

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More bounds on the expectation of a convex function of a random variable

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

More bounds on the expectation of a convex function of a random variable

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