A reduction result for location problems with polyhedral barriers

In this paper me consider the problem of locating one new facility in the plane with respect to a given set of existing facilities where a set of polyhedral barriers restricts traveling. This non-convex optimization problem can be reduced to a finite set of convex subproblems if the objective function is a convex function of the travel distances between the new and the existing facilities (like e.g. the median and center objective functions). An exact algorithm and a heuristic solution procedure based on this reduction result are developed. (C) 2001 Elsevier Science B.V. All rights reserved.