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Lagrangian decomposition and mixed-integer quadratic programming reformulations for probabilistically constrained quadratic programs |
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| Authors: | Xiaojin Zheng Xiaoling Sun Duan Li Xueting Cui |
| Institution: | 1. School of Economics and Management, Tongji University, Shanghai 200092, PR China;2. Department of Management Science, School of Management, Fudan University, Shanghai 200433, PR China;3. Department of Systems Engineering and Engineering Management, The Chinese University of Hong Kong, Shatin, N.T., Hong Kong |
| Abstract: | Probabilistically constrained quadratic programming (PCQP) problems arise naturally from many real-world applications and have posed a great challenge in front of the optimization society for years due to the nonconvex and discrete nature of its feasible set. We consider in this paper a special case of PCQP where the random vector has a finite discrete distribution. We first derive second-order cone programming (SOCP) relaxation and semidefinite programming (SDP) relaxation for the problem via a new Lagrangian decomposition scheme. We then give a mixed integer quadratic programming (MIQP) reformulation of the PCQP and show that the continuous relaxation of the MIQP is exactly the SOCP relaxation. This new MIQP reformulation is more efficient than the standard MIQP reformulation in the sense that its continuous relaxation is tighter than or at least as tight as that of the standard MIQP. We report preliminary computational results to demonstrate the tightness of the new convex relaxations and the effectiveness of the new MIQP reformulation. |
| Keywords: | Quadratic programming Probabilistic constraint Second-order cone programming relaxation Semidefinite program relaxation Mixed-integer quadratic program reformulation |
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