A Comparative Theoretical and Computational Study on Robust Counterpart Optimization: II. Probabilistic Guarantees on Constraint Satisfaction.

Probabilistic guarantees on constraint satisfaction for robust counterpart optimization are studied in this paper. The robust counterpart optimization formulations studied are derived from box, ellipsoidal, polyhedral, "interval+ellipsoidal" and "interval+polyhedral" uncertainty sets (Li, Z., Ding, R., and Floudas, C.A., A Comparative Theoretical and Computational Study on Robust Counterpart Optimization: I. Robust Linear and Robust Mixed Integer Linear Optimization, Ind. Eng. Chem. Res, 2011, 50, 10567). For those robust counterpart optimization formulations, their corresponding probability bounds on constraint satisfaction are derived for different types of uncertainty characteristic (i.e., bounded or unbounded uncertainty, with or without detailed probability distribution information). The findings of this work extend the results in the literature and provide greater flexibility for robust optimization practitioners in choosing tighter probability bounds so as to find less conservative robust solutions. Extensive numerical studies are performed to compare the tightness of the different probability bounds and the conservatism of different robust counterpart optimization formulations. Guiding rules for the selection of robust counterpart optimization models and for the determination of the size of the uncertainty set are discussed. Applications in production planning and process scheduling problems are presented.

[1]  Peng Sun,et al.  A Robust Optimization Perspective on Stochastic Programming , 2007, Oper. Res..

[2]  C. Floudas,et al.  A Comparative Theoretical and Computational Study on Robust Counterpart Optimization: I. Robust Linear Optimization and Robust Mixed Integer Linear Optimization. , 2011, Industrial & engineering chemistry research.

[3]  Melvyn Sim,et al.  The Price of Robustness , 2004, Oper. Res..

[4]  Allen L. Soyster,et al.  Technical Note - Convex Programming with Set-Inclusive Constraints and Applications to Inexact Linear Programming , 1973, Oper. Res..

[5]  Laurent El Ghaoui,et al.  Robust Solutions to Uncertain Semidefinite Programs , 1998, SIAM J. Optim..

[6]  Laurent El Ghaoui,et al.  Worst-Case Value-At-Risk and Robust Portfolio Optimization: A Conic Programming Approach , 2003, Oper. Res..

[7]  Christodoulos A. Floudas,et al.  Operational Planning of Large-Scale Industrial Batch Plants under Demand Due Date and Amount Uncertainty: II. Conditional Value-at-Risk Framework , 2010 .

[8]  W. Hoeffding Probability Inequalities for sums of Bounded Random Variables , 1963 .

[9]  Arkadi Nemirovski,et al.  Robust solutions of uncertain linear programs , 1999, Oper. Res. Lett..

[10]  A Ravindran Operations Research Methodologies , 2008 .

[11]  Christodoulos A. Floudas,et al.  A new robust optimization approach for scheduling under uncertainty: : I. Bounded uncertainty , 2004, Comput. Chem. Eng..

[12]  Christodoulos A. Floudas,et al.  Effective continuous-time formulation for short-term scheduling. 3. Multiple intermediate due dates , 1999 .

[13]  Christodoulos A. Floudas,et al.  Effective Continuous-Time Formulation for Short-Term Scheduling. 2. Continuous and Semicontinuous Processes , 1998 .

[14]  Laurent El Ghaoui,et al.  Robust Solutions to Least-Squares Problems with Uncertain Data , 1997, SIAM J. Matrix Anal. Appl..

[15]  Christodoulos A. Floudas,et al.  Short-term scheduling : New mathematical models vs algorithmic improvements , 1998 .

[16]  Arkadi Nemirovski,et al.  Robust solutions of Linear Programming problems contaminated with uncertain data , 2000, Math. Program..

[17]  Melvyn Sim,et al.  Robust linear optimization under general norms , 2004, Oper. Res. Lett..

[18]  Peter M. Verderame,et al.  Operational Planning of Large-Scale Industrial Batch Plants under Demand Due Date and Amount Uncertainty. I. Robust Optimization Framework , 2009 .

[19]  Yinyu Ye,et al.  Distributionally Robust Optimization Under Moment Uncertainty with Application to Data-Driven Problems , 2010, Oper. Res..

[20]  Melvyn Sim,et al.  Tractable Approximations to Robust Conic Optimization Problems , 2006, Math. Program..

[21]  Christodoulos A. Floudas,et al.  A new robust optimization approach for scheduling under uncertainty: II. Uncertainty with known probability distribution , 2007, Comput. Chem. Eng..

[22]  Melvyn Sim,et al.  Goal-Driven Optimization , 2009, Oper. Res..

[23]  Dimitris Bertsimas,et al.  A Soft Robust Model for Optimization Under Ambiguity , 2010, Oper. Res..