Global Minimization of a Linearly Constrained Concave Function by Partition of Feasible Domain

The problem of minimizing a concave function subject to linear inequality constraints may have many local solutions. Therefore, finding the global constrained minimum is a computationally difficult problem. A computational method is described which finds the global minimum of a smooth concave function over a polyhedron in Rn. The feasible domain is partitioned into a rectangular domain, which can be excluded from further consideration, and r ≤ 2n subdomains, at least one of which contains the global minimum. A known algorithm can be applied sequentially (or in parallel) to each of these r subdomains to compute the global minimum. A method is also presented (Appendix B) for the construction of nontrivial test problems for which the global minimum point is known. Given an arbitrary polyhedron and a selected vertex, it is shown how to determine a concave quadratic function (generally with many local minima) with its global minimum at the selected vertex.

[1]  M. Saunders,et al.  The Implementation of a Lagrangian-Based Algorithm for Sparse Nonlinear Constraints. , 1980 .

[2]  E. M. L. Beale,et al.  Global optimization using special ordered sets , 1976, Math. Program..

[3]  Manuel J. Carrillo A relaxation algorithm for the minimization of a quasiconcave function on a convex polyhedron , 1977, Math. Program..

[4]  M. Raghavachari,et al.  On Connections Between Zero-One Integer Programming and Concave Programming Under Linear Constraints , 1969, Oper. Res..

[5]  Glenn W. Graves,et al.  AN ALGORITHM FOR NONCONVEX PROGRAMMING , 1969 .

[6]  Edward H. McCall Performance results of the simplex algorithm for a set of real-world linear programming models , 1982, CACM.

[7]  J. B. Rosen,et al.  Construction of nonlinear programming test problems , 1965 .

[8]  Fred W. Glover,et al.  Convexity Cuts and Cut Search , 1973, Oper. Res..

[9]  Reiner Horst,et al.  An algorithm for nonconvex programming problems , 1976, Math. Program..

[10]  Michael A. Saunders,et al.  Large-scale linearly constrained optimization , 1978, Math. Program..

[11]  Hiroshi Konno,et al.  Maximization of A convex quadratic function under linear constraints , 1976, Math. Program..

[12]  G. McCormick Attempts to Calculate Global Solutions of Problems that May Have Local Minima , 1971 .

[13]  Karla L. Hoffman,et al.  A method for globally minimizing concave functions over convex sets , 1981, Math. Program..

[14]  J. B. Rosen TWO-PHASE ALGORITHM FOR NONLINEAR CONSTRAINT PROBLEMS11This research was supported in part by the National Science Foundation grant MCS 76-23311. Support by the Systems Optimization Lab, Department of Operations Research, Stanford University, during the author's sabbatical leave, is also gratefully , 1978 .

[15]  Nguyen V. Thoai,et al.  Convergent Algorithms for Minimizing a Concave Function , 1980, Math. Oper. Res..

[16]  E. Lawler The Quadratic Assignment Problem , 1963 .

[17]  Garth P. McCormick,et al.  Computability of global solutions to factorable nonconvex programs: Part I — Convex underestimating problems , 1976, Math. Program..

[18]  James E. Falk,et al.  A Successive Underestimation Method for Concave Minimization Problems , 1976, Math. Oper. Res..

[19]  George B. Dantzig,et al.  Linear programming and extensions , 1965 .