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Stochastic Two-Stage Programming

Stochastic Programming offers models and methods for decision problems wheresome of the data are uncertain. These models have features and structural properties which are preferably exploited by SP methods within the solution process. This work contributes to the methodology for two-stagemodels. In...

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Bibliographic Details
Main Author: Frauendorfer, Karl
Format: eBook
Language:English
Published: Berlin, Heidelberg Springer Berlin Heidelberg 1992, 1992
Edition:1st ed. 1992
Series:Lecture Notes in Economics and Mathematical Systems
Subjects:
Operations Research
Engineering Mathematics
Calculus Of Variations And Optimization
Control Theory
Systems Theory, Control
System Theory
Engineering / Data Processing
Mathematical Optimization
Operations Research And Decision Theory
Mathematical And Computational Engineering Applications
Calculus Of Variations
Online Access:
Collection: Springer Book Archives -2004 - Collection details see MPG.ReNa
Table of Contents:
  • IV An Illustrative Survey of Existing Approaches in Stochastic Two-Stage Programming
  • 21 Error Bounds for Stochastic Programs with Recourse (due to Kali & Stoyan)
  • 22 Approximation Schemes discussed by Birge & Wets
  • 23 Sublinear Bounding Technique (due to Birge & Wets)
  • 24 Stochastic Quasigradient Techniques (due to Ermoliev)
  • 25 Semi-Stochastic Approximation (due to Marti)
  • 26 Benders’ Decomposition with Importance Sampling (due to Dantzig & Glynn)
  • 27 Stochastic Decomposition (due to Higle & Sen)
  • 28 Mathematical Programming Techniques
  • 29 Scenarios and Policy Aggregation (due to Rockafellar & Wets)
  • V BRAIN — BaRycentric Approximation for Integrands (Implementation Issues)
  • 30 Storing Distributions given through a Finite Set of Parameters
  • 31 Evaluation of Initial Extremal Marginal Distributions
  • 32 Evaluation of Initial Outer and Inner Approximation
  • 33 Data forx-Simplicial Partition
  • 34 Evaluation of Extremal Distributions — Iteration!
  • 35 Evaluation of Outer and Inner Approximation — Iteration J
  • 36 x-Simplicial Refinement
  • VI Solving Stochastic Linear Two-Stage Problems (Numerical Results and Computational Experiences)
  • 37 Testproblems from Literature
  • 38 Randomly Generated Testproblems
  • 0 Preliminaries
  • I Stochastic Two-Stage Problems
  • 1 Convex Case
  • 2 Nonconvex Case
  • 3 Stability
  • 4 Epi-Convergence
  • 5 Saddle Property
  • 6 Stochastic Independence
  • 7 Special Convex Cases
  • II Duality and Stability in Convex Optimization (Extended Results for the Saddle Case)
  • 8 Characterization and Properties of Saddle Functions
  • 9 Primal and Dual Collections of Programs
  • 10 Normal and Stable Programs
  • 11 Relation to McLinden’s Results
  • 12 Application to Convex Programming
  • III Barycentric Approximation
  • 13 Inequalities and Extremal Probability Measures — Convex Case
  • 14 Inequalities and Extremal Probability Measures — Saddle Case
  • 15 Examples and Geometric Interpretation
  • 16 Iterated Approximation and x-Simplicial Refinement
  • 17 Application to Stochastic Two-Stage Programs
  • 18 Convergence of Approximations
  • 19 Refinement Strategy
  • 20 Iterative Completion

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