A New Lagrangian Multiplier Update Approach for Lagrangian Relaxation Based Unit Commitment

Large scale unit commitment problems are of combinatorial nature and are usually very hard to solve. Among various algorithms, Lagrangian relaxation (LR) based method is one the most promising approaches. LR method typically includes two steps: the dual optimization and feasible solution construction. The dual optimization plays a crucial role in determining the overall computational efficiency and solution quality of the algorithm. The subgradient based method is widely used for dual optimization, but often suffers from slow convergence. This article presents an improved subgradient based method based on the concept of step size scaling factor that may achieve speedy convergence for dual optimization. Case studies have demonstrated the effectiveness of the proposed approach.

[1]  D. P. Kothari,et al.  Evaluation of benefit of inter-area energy exchange of the indian power system based on multi-area unit commitment approach , 1998 .

[2]  N.P. Padhy,et al.  Unit commitment-a bibliographical survey , 2004, IEEE Transactions on Power Systems.

[3]  Laurence A. Wolsey,et al.  Integer and Combinatorial Optimization , 1988, Wiley interscience series in discrete mathematics and optimization.

[4]  Mokhtar S. Bazaraa,et al.  Nonlinear Programming: Theory and Algorithms , 1993 .

[5]  J. Waight,et al.  Experiences with Mixed Integer Linear Programming-Based Approaches in Short-Term Hydro Scheduling , 2001, IEEE Power Engineering Review.

[6]  A. Borghetti,et al.  Lagrangian Heuristics Based on Disaggregated Bundle Methods for Hydrothermal Unit Commitment , 2002, IEEE Power Engineering Review.

[7]  W. Ongsakul,et al.  Unit commitment by enhanced adaptive Lagrangian relaxation , 2004, IEEE Transactions on Power Systems.

[8]  A. Merlin,et al.  A New Method for Unit Commitment at Electricite De France , 1983, IEEE Transactions on Power Apparatus and Systems.

[9]  M. Caramanis,et al.  Efficient Lagrangian relaxation algorithms for industry size job-shop scheduling problems , 1998 .

[10]  Antonio J. Conejo,et al.  Short-term hydro-thermal coordination by Lagrangian relaxation: solution of the dual problem , 1999 .

[11]  S. M. Shahidehpour,et al.  Unit commitment with transmission security and voltage constraints , 1999 .

[12]  Enrique Francisco Castillo Ron,et al.  Building and solving mathematical programming models in engineering and science , 2002 .

[13]  Enrique Castillo,et al.  Building and Solving Mathematical Programming Models in Engineering and Science , 2001 .

[14]  Chuan-Ping Cheng,et al.  Unit commitment by Lagrangian relaxation and genetic algorithms , 2000 .