论文信息 - A generalized assignment problem with special ordered sets: a polyhedral approach

A generalized assignment problem with special ordered sets: a polyhedral approach

Abstract.We study a generalized assignment problem that arises in production scheduling in which special ordered sets of type II appear naturally in the formulation. We derive three families of facet-defining valid inequalities, and we show that they cut off all infeasible vertices of the LP relaxation. We also give the complete facetial description for a particular case. We then use the inequalities as cuts in a branch-and-cut scheme, and we report computational results that demonstrate the superiority of branch-and-cut over branch-and-bound on this class of problems.

George L. Nemhauser | Ellis L. Johnson | Ismael R. de Farias

[1] Gerhard Reinelt,et al. A Cutting Plane Algorithm for the Linear Ordering Problem , 1984, Oper. Res..

[2] John J. H. Forrest,et al. Practical Solution of Large Mixed Integer Programming Problems with Umpire , 1974 .

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

[4] E.M.L. Beale,et al. Branch and Bound Methods for Mathematical Programming Systems , 1977 .

[5] M. Padberg,et al. Addendum: Optimization of a 532-city symmetric traveling salesman problem by branch and cut , 1990 .

[6] David S. Johnson,et al. Computers and Intractability: A Guide to the Theory of NP-Completeness , 1978 .

[7] George L. Nemhauser,et al. A polyhedral approach to combinatorial complementarity programming problems , 1995 .

[8] Wilhelm Hummeltenberg. Implementations of special ordered sets in MP software , 1984 .

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

[10] Ellis L. Johnson,et al. Solving Large-Scale Zero-One Linear Programming Problems , 1983, Oper. Res..