Nonlinear Chance Constrained Problems: Optimality Conditions, Regularization and Solvers

We deal with chance constrained problems with differentiable nonlinear random functions and discrete distribution. We allow nonconvex functions both in the constraints and in the objective. We reformulate the problem as a mixed-integer nonlinear program and relax the integer variables into continuous ones. We approach the relaxed problem as a mathematical problem with complementarity constraints and regularize it by enlarging the set of feasible solutions. For all considered problems, we derive necessary optimality conditions based on Fréchet objects corresponding to strong stationarity. We discuss relations between stationary points and minima. We propose two iterative algorithms for finding a stationary point of the original problem. The first is based on the relaxed reformulation, while the second one employs its regularized version. Under validity of a constraint qualification, we show that the stationary points of the regularized problem converge to a stationary point of the relaxed reformulation and under additional condition it is even a stationary point of the original problem. We conclude the paper by a numerical example.

[1]  Maarten H. van der Vlerk,et al.  Integrated Chance Constraints: Reduced Forms and an Algorithm , 2006, Comput. Manag. Sci..

[2]  Patrizia Beraldi,et al.  An exact approach for solving integer problems under probabilistic constraints with random technology matrix , 2010, Ann. Oper. Res..

[3]  George L. Nemhauser,et al.  An integer programming approach for linear programs with probabilistic constraints , 2007, Math. Program..

[4]  François Margot,et al.  Solving Chance-Constrained Optimization Problems with Stochastic Quadratic Inequalities , 2016, Oper. Res..

[5]  Vlasta Kanková,et al.  On the convergence rate of empirical estimates in chance constrained stochastic programming , 1990, Kybernetika.

[6]  René Henrion,et al.  A Gradient Formula for Linear Chance Constraints Under Gaussian Distribution , 2012, Math. Oper. Res..

[7]  Tamás Szántai,et al.  Stochastic programming in water management: A case study and a comparison of solution techniques , 1991 .

[8]  Christian Kanzow,et al.  Constraint qualifications and optimality conditions for optimization problems with cardinality constraints , 2016, Math. Program..

[9]  Yong Wang,et al.  Asymptotic Analysis of Sample Average Approximation for Stochastic Optimization Problems with Joint Chance Constraints via Conditional Value at Risk and Difference of Convex Functions , 2014, J. Optim. Theory Appl..

[10]  Claudia A. Sagastizábal,et al.  Constrained Bundle Methods for Upper Inexact Oracles with Application to Joint Chance Constrained Energy Problems , 2014, SIAM J. Optim..

[11]  Maria Gabriela Martinez,et al.  Augmented Lagrangian method for probabilistic optimization , 2012, Ann. Oper. Res..

[12]  S. Vajda,et al.  Probabilistic Programming , 1972 .

[13]  Liwei Zhang,et al.  A Smoothing Function Approach to Joint Chance-Constrained Programs , 2014, J. Optim. Theory Appl..

[14]  Alexander Kogan,et al.  Threshold Boolean form for joint probabilistic constraints with random technology matrix , 2014, Math. Program..

[15]  Miguel A. Lejeune Pattern definition of the p-efficiency concept , 2012, Ann. Oper. Res..

[16]  Andrzej Ruszczynski,et al.  An Efficient Trajectory Method for Probabilistic Production-Inventory-Distribution Problems , 2007, Oper. Res..

[17]  Abdel Lisser,et al.  A second-order cone programming approach for linear programs with joint probabilistic constraints , 2012, Oper. Res. Lett..

[18]  Shabbir Ahmed,et al.  Convex relaxations of chance constrained optimization problems , 2014, Optim. Lett..

[19]  Maria Gabriela Martinez,et al.  Regularization methods for optimization problems with probabilistic constraints , 2013, Math. Program..

[20]  Bastian Goldlücke,et al.  Variational Analysis , 2014, Computer Vision, A Reference Guide.

[21]  R. Rockafellar,et al.  Conditional Value-at-Risk for General Loss Distributions , 2001 .

[22]  Jan Fabian Ehmke,et al.  Ensuring service levels in routing problems with time windows and stochastic travel times , 2015, Eur. J. Oper. Res..

[23]  András Prékopa,et al.  Dual method for the solution of a one-stage stochastic programming problem with random RHS obeying a discrete probability distribution , 1990, ZOR Methods Model. Oper. Res..

[24]  Alexander Shapiro,et al.  Lectures on Stochastic Programming - Modeling and Theory, Second Edition , 2014, MOS-SIAM Series on Optimization.

[25]  William M. Raike,et al.  Dissection Methods for Solutions in Chance Constrained Programming Problems Under Discrete Distributions , 1970 .

[26]  James R. Luedtke,et al.  A Sample Approximation Approach for Optimization with Probabilistic Constraints , 2008, SIAM J. Optim..

[27]  A. Azzalini,et al.  Statistical applications of the multivariate skew normal distribution , 2009, 0911.2093.

[28]  Pierre Bonami,et al.  On mathematical programming with indicator constraints , 2015, Math. Program..

[29]  René Henrion A Critical Note on Empirical (Sample Average, Monte Carlo) Approximation of Solutions to Chance Constrained Programs , 2011, System Modelling and Optimization.

[30]  Christian Kanzow,et al.  On a Reformulation of Mathematical Programs with Cardinality Constraints , 2015 .

[31]  Nilay Noyan,et al.  Mathematical programming approaches for generating p-efficient points , 2010, Eur. J. Oper. Res..

[32]  Heinz H. Bauschke,et al.  On Projection Algorithms for Solving Convex Feasibility Problems , 1996, SIAM Rev..

[33]  Stefan Scholtes,et al.  Convergence Properties of a Regularization Scheme for Mathematical Programs with Complementarity Constraints , 2000, SIAM J. Optim..

[34]  Ronald Hochreiter,et al.  A difference of convex formulation of value-at-risk constrained optimization , 2010 .

[35]  R. Rockafellar,et al.  Optimization of conditional value-at risk , 2000 .

[36]  Yi Yang,et al.  Sequential Convex Approximations to Joint Chance Constrained Programs: A Monte Carlo Approach , 2011, Oper. Res..

[37]  R. Henrion,et al.  Joint chance constrained programming for hydro reservoir management , 2013 .

[38]  A. Charnes,et al.  Cost Horizons and Certainty Equivalents: An Approach to Stochastic Programming of Heating Oil , 1958 .

[39]  Abdel Lisser,et al.  Chance constrained 0–1 quadratic programs using copulas , 2015, Optimization Letters.

[40]  Thomas A. Henzinger,et al.  Probabilistic programming , 2014, FOSE.

[41]  Alexander Shapiro,et al.  Convex Approximations of Chance Constrained Programs , 2006, SIAM J. Optim..

[42]  Martin Branda,et al.  Optimization Approaches to Multiplicative Tariff of Rates Estimation in Non-Life Insurance , 2014, Asia Pac. J. Oper. Res..

[43]  Darinka Dentcheva,et al.  Concavity and efficient points of discrete distributions in probabilistic programming , 2000, Math. Program..

[44]  James R. Luedtke A branch-and-cut decomposition algorithm for solving chance-constrained mathematical programs with finite support , 2013, Mathematical Programming.

[45]  Alexander D. Ioffe,et al.  On Metric and Calmness Qualification Conditions in Subdifferential Calculus , 2008 .

[46]  C. Kanzow,et al.  On the Guignard constraint qualification for mathematical programs with equilibrium constraints , 2005 .

[47]  Jonathan Cole Smith,et al.  Expectation and Chance-Constrained Models and Algorithms for Insuring Critical Paths , 2010, Manag. Sci..

[48]  Claudia A. Sagastizábal,et al.  Probabilistic optimization via approximate p-efficient points and bundle methods , 2017, Comput. Oper. Res..

[49]  Miguel A. Lejeune,et al.  Pattern-Based Modeling and Solution of Probabilistically Constrained Optimization Problems , 2012, Oper. Res..

[50]  Maarten H. van der Vlerk,et al.  An ALM model for pension funds using integrated chance constraints , 2010, Ann. Oper. Res..

[51]  Christian Kanzow,et al.  Constraint Qualifications and Optimality Conditions of Cardinality-Constrained Optimization Problems , 2016 .