Publication at Faculty of Mathematics and Physics |
2005
Abstract
We consider a class of disjunctive minimization problems, the objective function of which can be expressed as the maximum of a finite number of continuous functions. The constraints of the problems consist of m disjunctive constraints.
A special structure of the problems makes it possible to find a global minimum after at most mn smaller minimization subproblems had been solved. The results can be applied in location problems or machine time scheduling problems.