Solving Lagrangian variational inequalities with applications to stochastic programming

Solving Lagrangian variational inequalities with applications to stochastic programming

Lagrangian variational inequalities feature both primal and dual elements in expressing first-order conditions for optimality in a wide variety of settings where “multipliers” in a very general sense need to be brought in. Their stochastic version relates to problems of stochastic programming and co...

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Bibliographic Details
Main Authors: Rockafellar, R.T., Sun, Jie
Format: Journal Article
Language:English
Published: SPRINGER HEIDELBERG 2020
Subjects:
Science & Technology
Technology
Physical Sciences
Computer Science, Software Engineering
Operations Research & Management Science
Mathematics, Applied
Computer Science
Mathematics
Stochastic variational inequality problems
Stochastic programming problems
Lagrangian variational inequalities
Lagrange multipliers
Progressive hedging algorithm
Proximal point algorithm
Composite optimization
Online Access:http://hdl.handle.net/20.500.11937/91433
Description
Summary:Lagrangian variational inequalities feature both primal and dual elements in expressing first-order conditions for optimality in a wide variety of settings where “multipliers” in a very general sense need to be brought in. Their stochastic version relates to problems of stochastic programming and covers not only classical formats with inequality constraints but also composite models with nonsmooth objectives. The progressive hedging algorithm, as a means of solving stochastic programming problems, has however focused so far only on optimality conditions that correspond to variational inequalities in primal variables alone. Here that limitation is removed by appealing to a recent extension of progressive hedging to multistage stochastic variational inequalities in general.

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