Approximation of Probabilistic Constraints in Stochastic Programming Problems with a Probability Measure Kernel

Approximation of Probabilistic Constraints in Stochastic Programming Problems with a Probability Measure Kernel

We consider a linear stochastic programming problem with a deterministic objective function and individual probabilistic constraints. Each probabilistic constraint is a lower bound on the probability function equal to the probability of the fulfillment of a certain linear inequality. We propose to f...

Full description

Saved in:
Bibliographic Details
Published in:Automation and remote control Vol. 80; no. 11; pp. 2005 - 2016
Main Authors: Vasil’eva, S. N., Kan, Yu. S.
Format: Journal Article
Language:English
Published: Moscow Pleiades Publishing 01-11-2019
Springer Nature B.V
Subjects:
Approximation
CAE) and Design
Calculus of Variations and Optimal Control; Optimization
Computer-Aided Engineering (CAD
Control
Inequalities
Kernels
Linear functions
Linear programming
Lower bounds
Mathematical analysis
Mathematical programming
Mathematics
Mathematics and Statistics
Mechanical Engineering
Mechatronics
Nonlinear programming
Probability theory
Robotics
Statistical analysis
Stochastic programming
Stochastic Systems
Systems Theory
stochastic programming
probabilistic constraints
kernel of a probabilistic measure
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:We consider a linear stochastic programming problem with a deterministic objective function and individual probabilistic constraints. Each probabilistic constraint is a lower bound on the probability function equal to the probability of the fulfillment of a certain linear inequality. We propose to first represent probabilistic constraints in the form of equivalent inequalities for the quantile functions. After that, each quantile function is approximated using the confidence method. The main analytic tool is based on polyhedral approximation of the p -kernel for the multidimensional probability distribution. For the case when probability functions are defined by linear inequalities, constraints on quantile functions are with arbitrary accuracy approximated by systems of deterministic linear inequalities. As a result, the original problem is approximated by a linear programming problem.
ISSN:0005-1179
1608-3032
DOI:10.1134/S0005117919110055