An efficient algorithm for globally minimizing sum of quadratic ratios problem with nonconvex quadratic constraints

In this paper a new branch and bound algorithm based on the rectangular partition and the Lagrangian relaxation for solving sum of quadratic ratios problem with nonconvex quadratic constraints (QSRP) is proposed. Firstly, the problem QSRP is converted into an equivalent sum of linear ratios problem with quadratic constraints (LSRP). Then, the bounding procedure is investigated by minimizing the restricted Lagrangian function of LSRP with a given estimate of the Lagrange multipliers. Minimizing a linear relaxation of the restricted Lagrangian overcomes the difficulty that the restricted Lagrangian is often nonconvex and facilitates the use of Lagrangian duality within a global optimization framework. In the algorithm, the interval Newton method is used to facilitate convergence in the neighborhood of the global solution. The proposed algorithm is convergent to the global minimum through the successive refinement of the solutions of a series of linear programming problems. Finally, numerical experiments are reported to show the efficiency of our algorithm.

[1]  Chun-Feng Wang,et al.  Global optimization for sum of linear ratios problem with coefficients , 2006, Appl. Math. Comput..

[2]  H. P. Benson,et al.  Global Optimization Algorithm for the Nonlinear Sum of Ratios Problem , 2002 .

[3]  Danny C. Sorensen,et al.  Implicit Application of Polynomial Filters in a k-Step Arnoldi Method , 1992, SIAM J. Matrix Anal. Appl..

[4]  Toshihide Ibaraki,et al.  Parametric approaches to fractional programs , 1983, Math. Program..

[5]  Tim Van Voorhis,et al.  A Global Optimization Algorithm using Lagrangian Underestimates and the Interval Newton Method , 2002, J. Glob. Optim..

[6]  HAROLD P. BENSON Using concave envelopes to globally solve the nonlinear sum of ratios problem , 2002, J. Glob. Optim..

[7]  S. K. Mishra,et al.  Nonconvex Optimization and Its Applications , 2008 .

[8]  Mirjam Dür,et al.  Lagrange Duality and Partitioning Techniques in Nonconvex Global Optimization , 1997, Universität Trier, Mathematik/Informatik, Forschungsbericht.

[9]  R. B. Kearfott Rigorous Global Search: Continuous Problems , 1996 .

[10]  S. S. Chadha Fractional programming with absolute-value functions , 2002, Eur. J. Oper. Res..

[11]  Le Thi Hoai An,et al.  A Branch and Bound Method via d.c. Optimization Algorithms and Ellipsoidal Technique for Box Constrained Nonconvex Quadratic Problems , 1998, J. Glob. Optim..

[12]  Hiroshi Konno,et al.  Maximization of the Ratio of Two Convex Quadratic Functions over a Polytope , 2001, Comput. Optim. Appl..

[13]  Ya-Xiang Yuan,et al.  A Conic Trust-Region Method for Nonlinearly Constrained Optimization , 2001, Ann. Oper. Res..

[14]  R. Horst,et al.  Global Optimization: Deterministic Approaches , 1992 .

[15]  H. Konno,et al.  BOND PORTFOLIO OPTIMIZATION PROBLEMS AND THEIR APPLICATIONS TO INDEX TRACKING: A PARTIAL OPTIMIZATION APPROACH , 1996 .

[16]  H. P. Benson,et al.  On the Global Optimization of Sums of Linear Fractional Functions over a Convex Set , 2004 .

[17]  W. Davidon Conic Approximations and Collinear Scalings for Optimizers , 1980 .

[18]  K. A. Ariyawansa Deriving collinear scaling algorithms as extensions of quasi-Newton methods and the local convergence of DFP- and BFGS-related collinear scaling algorithms , 1990, Math. Program..

[19]  Roland W. Freund,et al.  Solving the Sum-of-Ratios Problem by an Interior-Point Method , 2001, J. Glob. Optim..

[20]  Takahito Kuno,et al.  A branch-and-bound algorithm for maximizing the sum of several linear ratios , 2002, J. Glob. Optim..