A subgradient-based cutting plane method to calculate convex hull market prices

The unit commitment and economic dispatch problem in electricity markets has mixed-integer variables with piecewise linear bids. By using Lagrangian relaxation, a concave and piecewise linear dual problem is obtained. The resulting multipliers can be used to set prices in the convex hull pricing model, and this would result in the minimal uplift payment. This paper presents a subgradient-based cutting plane method to obtain the optimal multipliers in a computationally efficient way. The idea is to use subgradients to find an approximate center of the feasible polyhedron within the cutting plane framework. The time consuming process of finding centers such as analytic centers can thus be reduced. At nondifferentiable points, the cuts resulting from approximate centers may oscillate, and this difficulty is overcome by choosing a proper linear combination of these oscillating subgradients. The analytic centers are inserted as needed as spacer steps to ensure algorithm convergence. Testing results demonstrate the effectiveness of the algorithm.

[1]  L. Vandenberghe,et al.  Localization and Cutting-Plane Methods , 2007 .

[2]  Dimitri P. Bertsekas,et al.  Nonlinear Programming , 1997 .

[3]  Ralph E. Gomory,et al.  An algorithm for integer solutions to linear programs , 1958 .

[4]  Stephen P. Boyd,et al.  Convex Optimization , 2004, Algorithms and Theory of Computation Handbook.

[5]  J. A. Amalfi,et al.  An optimization-based method for unit commitment , 1992 .

[6]  William W. Hogan,et al.  Market-Clearing Electricity Prices and Energy Uplift , 2008 .

[7]  Jacek Gondzio,et al.  Solving nonlinear multicommodity flow problems by the analytic center cutting plane method , 1997, Math. Program..

[8]  J. E. Kelley,et al.  The Cutting-Plane Method for Solving Convex Programs , 1960 .

[9]  J. Goffin,et al.  A Lagrangian Relaxation of the Capacitated Multi-Item Lot Sizing Problem Solved with an Interior Poi , 1997 .

[10]  S. Chandra Decomposition principle for linear fractional functional programs , 1968 .

[11]  Michael R. Bussieck,et al.  Optimal Lines in Public Rail Transport , 1998 .

[12]  Giuseppe Carlo Calafiore,et al.  A probabilistic analytic center cutting plane method for feasibility of uncertain LMIs , 2007, Autom..

[13]  Martin W. P. Savelsbergh,et al.  Lifted flow cover inequalities for mixed 0-1 integer programs , 1999, Math. Program..

[14]  Peter B. Luh,et al.  Scheduling flexible manufacturing systems for apparel production , 1996, IEEE Trans. Robotics Autom..

[15]  Laurence A. Wolsey,et al.  Valid Linear Inequalities for Fixed Charge Problems , 1985, Oper. Res..

[16]  Qiaozhu Zhai,et al.  A new method for unit commitment with ramping constraints , 2002 .