Adjustable Robust Two-Stage Polynomial Optimization with Application to AC Optimal Power Flow

In this work, we consider two-stage polynomial optimization problems under uncertainty. In the first stage, one needs to decide upon the values of a subset of optimization variables (control variables). In the second stage, the uncertainty is revealed and the rest of optimization variables (state variables) are set up as a solution to a known system of possibly non-linear equations. This type of problem occurs, for instance, in optimization for dynamical systems, such as electric power systems. We combine tools from polynomial and robust optimization to provide a framework for general adjustable robust polynomial optimization problems. In particular, we propose an iterative algorithm to build a sequence of (approximately) robustly feasible solutions with an improving objective value and verify robust feasibility or infeasibility of the resulting solution under a semialgebraic uncertainty set. At each iteration, the algorithm optimizes over a subset of the feasible set and uses affine approximations of the second-stage equations while preserving the non-linearity of other constraints. The algorithm allows for additional simplifications in case of possibly non-convex quadratic problems under ellipsoidal uncertainty. We implement our approach for AC Optimal Power Flow and demonstrate the performance of our proposed method on Matpower instances.

[1]  Gerald B. Folland,et al.  Real Analysis: Modern Techniques and Their Applications , 1984 .

[2]  Timo de Wolff,et al.  A Positivstellensatz for Sums of Nonnegative Circuit Polynomials , 2016, SIAM J. Appl. Algebra Geom..

[3]  Krishnamurthy Dvijotham,et al.  Solvability Regions of Affinely Parameterized Quadratic Equations , 2018, IEEE Control Systems Letters.

[4]  Markus Schweighofer Certificates for nonnegativity of polynomials with zeros on compact semialgebraic sets , 2005 .

[5]  Urray M Arshall Representations of non-negative polynomials having finitely many zeros , 2006 .

[6]  Tamás Terlaky,et al.  A Survey of the S-Lemma , 2007, SIAM Rev..

[7]  Claus Scheiderer,et al.  Distinguished representations of non-negative polynomials , 2005 .

[8]  Jean B. Lasserre A Sum of Squares Approximation of Nonnegative Polynomials , 2006, SIAM J. Optim..

[9]  Dick den Hertog,et al.  Multistage Adjustable Robust Mixed-Integer Optimization via Iterative Splitting of the Uncertainty Set , 2016, INFORMS J. Comput..

[10]  Xu Andy Sun,et al.  Adaptive Robust Optimization for the Security Constrained Unit Commitment Problem , 2013, IEEE Transactions on Power Systems.

[11]  L. Wehenkel,et al.  Cautious Operation Planning Under Uncertainties , 2012, IEEE Transactions on Power Systems.

[12]  Daniel Bienstock,et al.  Strong NP-hardness of AC power flows feasibility , 2019, Oper. Res. Lett..

[13]  R. Saigal,et al.  Handbook of semidefinite programming : theory, algorithms, and applications , 2000 .

[14]  Didier Henrion,et al.  Approximate Volume and Integration for Basic Semialgebraic Sets , 2009, SIAM Rev..

[15]  Daniel K. Molzahn,et al.  Lasserre Hierarchy for Large Scale Polynomial Optimization in Real and Complex Variables , 2017, SIAM J. Optim..

[16]  Xu Andy Sun,et al.  The Adaptive Robust Multi-Period Alternating Current Optimal Power Flow Problem , 2018, IEEE Transactions on Power Systems.

[17]  Amir Ardestani-Jaafari,et al.  Robust Optimization of Sums of Piecewise Linear Functions with Application to Inventory Problems , 2015, Oper. Res..

[18]  Gabriela Hug,et al.  Convex Relaxations of Chance Constrained AC Optimal Power Flow , 2017, 2018 IEEE Power & Energy Society General Meeting (PESGM).

[19]  M. Spivak Calculus On Manifolds: A Modern Approach To Classical Theorems Of Advanced Calculus , 2019 .

[20]  Marc Vuffray,et al.  Monotonicity Properties of Physical Network Flows and Application to Robust Optimal Allocation , 2020, Proceedings of the IEEE.

[21]  O. Alsaç,et al.  DC Power Flow Revisited , 2009, IEEE Transactions on Power Systems.

[22]  Line A. Roald,et al.  Towards an AC Optimal Power Flow Algorithm with Robust Feasibility Guarantees , 2018, 2018 Power Systems Computation Conference (PSCC).

[23]  Dick den Hertog,et al.  A survey of adjustable robust optimization , 2019, Eur. J. Oper. Res..

[24]  R D Zimmerman,et al.  MATPOWER: Steady-State Operations, Planning, and Analysis Tools for Power Systems Research and Education , 2011, IEEE Transactions on Power Systems.

[25]  John Lygeros,et al.  A Probabilistic Framework for Reserve Scheduling and ${\rm N}-1$ Security Assessment of Systems With High Wind Power Penetration , 2013, IEEE Transactions on Power Systems.

[26]  Luc Jaulin,et al.  Inner and Outer Approximations of Existentially Quantified Equality Constraints , 2006, CP.

[27]  Krishnamurthy Dvijotham,et al.  Convex Restriction of Power Flow Feasibility Sets , 2018, IEEE Transactions on Control of Network Systems.

[28]  Hoay Beng Gooi,et al.  Ellipsoidal Prediction Regions for Multivariate Uncertainty Characterization , 2017, IEEE Transactions on Power Systems.

[29]  Veit Hagenmeyer,et al.  Chance-Constrained AC Optimal Power Flow: A Polynomial Chaos Approach , 2019, IEEE Transactions on Power Systems.

[30]  A. Ben-Tal,et al.  Adjustable robust solutions of uncertain linear programs , 2004, Math. Program..

[31]  Göran Andersson,et al.  Chance-Constrained AC Optimal Power Flow: Reformulations and Efficient Algorithms , 2017, IEEE Transactions on Power Systems.

[32]  Daniel K. Molzahn,et al.  Robust AC Optimal Power Flow with Convex Restriction , 2020, 2005.04835.

[33]  L. H. Fink,et al.  Understanding automatic generation control , 1992 .

[34]  Dmitriy Drusvyatskiy,et al.  Transversality and Alternating Projections for Nonconvex Sets , 2014, Found. Comput. Math..

[35]  Jean B. Lasserre,et al.  Tractable approximations of sets defined with quantifiers , 2014, Math. Program..

[36]  B. Reznick,et al.  A new bound for Pólya's Theorem with applications to polynomials positive on polyhedra , 2001 .

[37]  Chrysanthos E. Gounaris,et al.  A generalized cutting‐set approach for nonlinear robust optimization in process systems engineering , 2021 .

[38]  J. Lofberg,et al.  YALMIP : a toolbox for modeling and optimization in MATLAB , 2004, 2004 IEEE International Conference on Robotics and Automation (IEEE Cat. No.04CH37508).

[39]  Daniel Bienstock,et al.  Computing robust basestock levels , 2008, Discret. Optim..

[40]  Xu Andy Sun,et al.  Multistage Robust Unit Commitment With Dynamic Uncertainty Sets and Energy Storage , 2016, IEEE Transactions on Power Systems.

[41]  Janez Povh,et al.  A new approximation hierarchy for polynomial conic optimization , 2019, Computational Optimization and Applications.

[42]  Parikshit Shah,et al.  Relative Entropy Relaxations for Signomial Optimization , 2014, SIAM J. Optim..

[43]  Jiawang Nie,et al.  Optimality conditions and finite convergence of Lasserre’s hierarchy , 2012, Math. Program..

[44]  Daniel K. Molzahn,et al.  Computing the Feasible Spaces of Optimal Power Flow Problems , 2016, IEEE Transactions on Power Systems.

[45]  Konstantin Turitsyn,et al.  Sequential Convex Restriction and its Applications in Robust Optimization , 2019, 1909.01778.

[46]  Ian A. Hiskens,et al.  A Survey of Relaxations and Approximations of the Power Flow Equations , 2019, Foundations and Trends® in Electric Energy Systems.

[47]  Long Zhao,et al.  Solving two-stage robust optimization problems using a column-and-constraint generation method , 2013, Oper. Res. Lett..

[48]  Michael Stingl,et al.  Deciding Robust Feasibility and Infeasibility Using a Set Containment Approach: An Application to Stationary Passive Gas Network Operations , 2018, SIAM J. Optim..

[49]  Xiaolong Kuang,et al.  Alternative LP and SOCP Hierarchies for ACOPF Problems , 2017, IEEE Transactions on Power Systems.

[50]  Michael Chertkov,et al.  Chance-Constrained Optimal Power Flow: Risk-Aware Network Control under Uncertainty , 2012, SIAM Rev..

[51]  Jakub Marecek,et al.  Optimal Power Flow as a Polynomial Optimization Problem , 2014, IEEE Transactions on Power Systems.

[52]  Johanna L. Mathieu,et al.  Water distribution networks as flexible loads: A chance-constrained programming approach , 2020 .

[53]  Angelos Georghiou,et al.  A Primal-Dual Lifting Scheme for Two-Stage Robust Optimization , 2020, Oper. Res..

[54]  Eilyan Bitar,et al.  Robust AC Optimal Power Flow , 2017, IEEE Transactions on Power Systems.