Tabu Search - Part II

This is the second half of a two part series devoted to the tabu search metastrategy for optimization problems. Part I introduced the fundamental ideas of tabu search as an approach for guiding other heuristics to overcome the limitations of local optimality, both in a deterministic and a probabilistic framework. Part I also reported successful applications from a wide range of settings, in which tabu search frequently made it possible to obtain higher quality solutions than previously obtained with competing strategies, generally with less computational effort. Part II, in this issue, examines refinements and more advanced aspects of tabu search. Following a brief review of notation, Part II introduces new dynamic strategies for managing tabu lists, allowing fuller exploitation of underlying evaluation functions. In turn, the elements of staged search and structured move sets are characterized, which bear on the issue of finiteness. Three ways of applying tabu search to the solution of integer programmin...

[1]  Leon Steinberg,et al.  The Backboard Wiring Problem: A Placement Algorithm , 1961 .

[2]  Douglass J. Wilde,et al.  Foundations of Optimization. , 1967 .

[3]  G. Nemhauser,et al.  Integer Programming , 2020 .

[4]  Fred W. Glover,et al.  Technical Note - A Note on Zero-One Integer and Concave Programming , 1972, Oper. Res..

[5]  Sam L. Savage,et al.  Some theoretical implications of local optimization , 1976, Math. Program..

[6]  Richard M. Karp,et al.  Probabilistic Analysis of Partitioning Algorithms for the Traveling-Salesman Problem in the Plane , 1977, Math. Oper. Res..

[7]  F. Glover HEURISTICS FOR INTEGER PROGRAMMING USING SURROGATE CONSTRAINTS , 1977 .

[8]  Robert G. Jeroslow,et al.  Cutting-Plane Theory: Disjunctive Methods , 1977 .

[9]  J. R. Walters Studies in Integer Programming , 1978 .

[10]  E. Balas,et al.  Pivot and Complement–A Heuristic for 0-1 Programming , 1980 .

[11]  J. Wesley Barnes,et al.  Scheduling Jobs with Linear Delay Penalties and Sequence Dependent Setup Costs , 1981, Oper. Res..

[12]  C. D. Gelatt,et al.  Optimization by Simulated Annealing , 1983, Science.

[13]  Fred Glover,et al.  Interactive decision software and computer graphics for architectural and space planning , 1985 .

[14]  F. Glover,et al.  New Polynomial Shortest Path Algorithms and Their Computational Attributes , 1985 .

[15]  Fred W. Glover,et al.  Future paths for integer programming and links to artificial intelligence , 1986, Comput. Oper. Res..

[16]  L. Personnaz,et al.  Collective computational properties of neural networks: New learning mechanisms. , 1986, Physical review. A, General physics.

[17]  Alistair I. Mees,et al.  Convergence of an annealing algorithm , 1986, Math. Program..

[18]  William R. Stewart Accelerated branch exchange heuristics for symmetric traveling salesman problems , 1987, Networks.

[19]  Jimmy Kwok-Ching Lam,et al.  An efficient simulated annealing schedule , 1988 .

[20]  F. Glover,et al.  The application of tabu search to the symmetric traveling salesman problem , 1989 .

[21]  Harvey J. Greenberg,et al.  New approaches for heuristic search: A bilateral linkage with artificial intelligence , 1989 .

[22]  Fred W. Glover,et al.  Tabu Search - Part I , 1989, INFORMS J. Comput..

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

[24]  Jadranka Skorin-Kapov,et al.  Tabu Search Applied to the Quadratic Assignment Problem , 1990, INFORMS J. Comput..

[25]  Dominique de Werra,et al.  A convoy scheduling problem , 1991, Discret. Appl. Math..

[26]  Fred W. Glover,et al.  Least-cost network topology design for a new service , 1991, Ann. Oper. Res..