Boland, Natashia; Dumitrescu, Irina; Froyland, Gary; Kalinowski, Thomas

Author(s)

Boland, Natashia

Dumitrescu, Irina

Froyland, Gary

Kalinowski, Thomas

Publication Date

2016-05

Abstract

We consider multistage stochastic programs, in which decisions can adapt over time, (i.e., at each stage), in response to observation of one or more random variables (uncertain parameters). The case that the time at which each observation occurs is decision-dependent, known as stochastic programming with endogeneous observation of uncertainty, presents particular challenges in handling non-anticipativity. Although such stochastic programs can be tackled by using binary variables to model the time at which each endogenous uncertain parameter is observed, the consequent conditional non-anticipativity constraints form a very large class, with cardinality in the order of the square of the number of scenarios. However, depending on the properties of the set of scenarios considered, only very few of these constraints may be required for validity of the model. Here we characterize minimal sufficient sets of non-anticipativity constraints, and prove that their matroid structure enables sets of minimum cardinality to be found efficiently, under general conditions on the structure of the scenario set.

Citation

Mathematical Programming, 157(1), p. 69-93

ISSN

1436-4646

0025-5610

Link

https://hdl.handle.net/1959.11/26794

Publisher

Springer

Title

Minimum cardinality non-anticipativity constraint sets for multistage stochastic programming

Type of document

Journal Article

Entity Type

Publication

Author(s)	Boland, Natashia Dumitrescu, Irina Froyland, Gary Kalinowski, Thomas
Publication Date	2016-05
Abstract	We consider multistage stochastic programs, in which decisions can adapt over time, (i.e., at each stage), in response to observation of one or more random variables (uncertain parameters). The case that the time at which each observation occurs is decision-dependent, known as stochastic programming with endogeneous observation of uncertainty, presents particular challenges in handling non-anticipativity. Although such stochastic programs can be tackled by using binary variables to model the time at which each endogenous uncertain parameter is observed, the consequent conditional non-anticipativity constraints form a very large class, with cardinality in the order of the square of the number of scenarios. However, depending on the properties of the set of scenarios considered, only very few of these constraints may be required for validity of the model. Here we characterize minimal sufficient sets of non-anticipativity constraints, and prove that their matroid structure enables sets of minimum cardinality to be found efficiently, under general conditions on the structure of the scenario set.
Citation	Mathematical Programming, 157(1), p. 69-93
ISSN	1436-4646 0025-5610
Link	https://hdl.handle.net/1959.11/26794
Publisher	Springer
Title	Minimum cardinality non-anticipativity constraint sets for multistage stochastic programming
Type of document	Journal Article
Entity Type	Publication

Minimum cardinality non-anticipativity constraint sets for multistage stochastic programming

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