Email this article Linearization method for solving quantile optimization problems with loss function depending on a vector of small random parameters
- Authors: Vasil’eva S.N.1, Kan Y.S.1
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Affiliations:
- Moscow Aviation Institute (National Research University)
- Issue: Vol 78, No 7 (2017)
- Pages: 1251-1263
- Section: Stochastic Systems
- URL: https://ogarev-online.ru/0005-1179/article/view/150635
- DOI: https://doi.org/10.1134/S0005117917070074
- ID: 150635
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Abstract
We propose a method for solving quantile optimization problems with a loss function that depends on a vector of small random parameters. This method is based on using a model linearized with respect to the random vector instead of the original nonlinear loss function. We show that in first approximation, the quantile optimization problem reduces to a minimax problem where the uncertainty set is a kernel of a probability measure.
About the authors
S. N. Vasil’eva
Moscow Aviation Institute (National Research University)
Author for correspondence.
Email: sofia_mai@mail.ru
Russian Federation, Moscow
Yu. S. Kan
Moscow Aviation Institute (National Research University)
Email: sofia_mai@mail.ru
Russian Federation, Moscow
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