Minimum Loss Network Reconfiguration Using Mixed-Integer Convex Programming

This paper proposes a mixed-integer conic programming formulation for the minimum loss distribution network reconfiguration problem. This formulation has two features: first, it employs a convex representation of the network model which is based on the conic quadratic format of the power flow equations and second, it optimizes the exact value of the network losses. The use of a convex model in terms of the continuous variables is particularly important because it ensures that an optimal solution obtained by a branch-and-cut algorithm for mixed-integer conic programming is global. In addition, good quality solutions with a relaxed optimality gap can be very efficiently obtained. A polyhedral approximation which is amenable to solution via more widely available mixed-integer linear programming software is also presented. Numerical results on practical test networks including distributed generation show that mixed-integer convex optimization is an effective tool for network reconfiguration.

[1]  J. J. Grainger,et al.  Distribution feeder reconfiguration for loss reduction , 1988 .

[2]  R. E. Lee,et al.  A method and its application to evaluate automated distribution control , 1988 .

[3]  D. Shirmohammadi,et al.  Reconfiguration of electric distribution networks for resistive line losses reduction , 1989 .

[4]  Felix F. Wu,et al.  Network Reconfiguration in Distribution Systems for Loss Reduction and Load Balancing , 1989, IEEE Power Engineering Review.

[5]  Hsiao-Dong Chiang,et al.  Optimal network reconfigurations in distribution systems. II. Solution algorithms and numerical results , 1990 .

[6]  H. Chiang,et al.  Optimal network reconfigurations in distribution systems. I. A new formulation and a solution methodology , 1990 .

[7]  R.P. Broadwater,et al.  Computer-Aided Protection System Design with Reconfiguration , 1991, IEEE Power Engineering Review.

[8]  J.M.R. Munoz,et al.  A line-current measurement based state estimator , 1992 .

[9]  S. K. Basu,et al.  A new algorithm for the reconfiguration of distribution feeders for loss minimization , 1992 .

[10]  Y.-Y. Hsu,et al.  Planning of distribution feeder reconfiguration with protective device coordination , 1993 .

[11]  Nikos D. Hatziargyriou,et al.  Optimal operation of distribution networks , 1996 .

[12]  Northwoods Pkwy Distribution Network Reconfiguration: Single Loop Optimization , 1996 .

[13]  A. G. Expósito,et al.  Reliable load flow technique for radial distribution networks , 1999 .

[14]  P. Pop The generalized minimum spanning tree problem , 2000 .

[15]  Jose Roberto Sanches Mantovani,et al.  Reconfiguracao de sistemas de distribuicao radiais utilizando o criterio de queda de tensao , 2000 .

[16]  Arkadi Nemirovski,et al.  On Polyhedral Approximations of the Second-Order Cone , 2001, Math. Oper. Res..

[17]  K. L. Butler,et al.  Network Reconfiguration for Service Restoration in Shipboard Power Distribution Systems , 2001, IEEE Power Engineering Review.

[18]  C. Su,et al.  Network Reconfiguration of Distribution Systems Using Improved Mixed-Integer Hybrid Differential Evolution , 2002, IEEE Power Engineering Review.

[19]  C. Su,et al.  Variable scaling hybrid differential evolution for solving network reconfiguration of distribution systems , 2005 .

[20]  A. G. Expósito,et al.  Path-based distribution network modeling: application to reconfiguration for loss reduction , 2005, IEEE Transactions on Power Systems.

[21]  Ji-Pyng Chiou,et al.  Distribution network reconfiguration for loss reduction by ant colony search algorithm , 2005 .

[22]  H. P. Schmidt,et al.  Fast reconfiguration of distribution systems considering loss minimization , 2005, IEEE Transactions on Power Systems.

[23]  R. Jabr Radial distribution load flow using conic programming , 2006, IEEE Transactions on Power Systems.

[24]  S. Carneiro,et al.  A New Distribution System Reconfiguration Approach Using Optimum Power Flow and Sensitivity Analysis for Loss Reduction , 2006, IEEE Transactions on Power Systems.

[25]  P. R. Bijwe,et al.  An Efficient Algorithm for Minimum Loss Reconfiguration of Distribution System Based on Sensitivity and Heuristics , 2008, IEEE Transactions on Power Systems.

[26]  R. Romero,et al.  An Efficient Codification to Solve Distribution Network Reconfiguration for Loss Reduction Problem , 2008, IEEE Transactions on Power Systems.

[27]  M. Matos,et al.  Distribution Systems Reconfiguration Based on OPF Using Benders Decomposition , 2009, IEEE Transactions on Power Delivery.

[28]  J. Riquelme-Santos,et al.  A simpler and exact mathematical model for the computation of the minimal power losses tree , 2010 .

[29]  Yuan-Kang Wu,et al.  Study of Reconfiguration for the Distribution System With Distributed Generators , 2010, IEEE Transactions on Power Delivery.

[30]  M. Raju,et al.  Optimal Network Reconfiguration of Large-Scale Distribution System Using Harmony Search Algorithm , 2011, IEEE Transactions on Power Systems.