Abstract: The multicriterion problem of discrete optimization on the feasible combinatorial set of polyarrangements is examined. Structural properties of feasible region and different types of efficient decisions are explored. On the basis of development of ideas of Euclidean combinatorial optimization and method of general criterion possible approaches for the solution of multicriterion combinatorial problem on the set of polyrrangements is developed and substantiated.

Keywords: multicriterion optimization, discrete optimization, polyarrangements, Pareto-optimal solution, weakly and strongly efficient solutions, combinatorial set of polyarrangements.

ACM Classification Keywords: G 2.1 Combinatorics (F2.2), G 1.6 Optimization

Link:

MULTICRITERION PROBLEMS ON THE COMBINATORIAL SET OF POLYARRANGEMENTS

Natalia Semenova, Lyudmyla Kolechkina

http://www.foibg.com/ibs_isc/ibs-15/ibs-15-p15.pdf