Capacitated maximum covering location models: Formulations and solution procedures

This paper presents two formulations and two solution procedures for a capacitated maximum covering location problem. In the first formulation, the problem is presented as a mixed-interger linear programming model which maximizes covered demand. In the second model, the objective function maximizes the weighted covered demand while at the same time minimizing the average distance from the uncovered demands to the located facilities. The second formulation attempts to account for the assignment of the demand which is not "covered" to located facilities which have excess capacity. This assignment is very important, especially for locating emergency service facilities. Two heuristic procedures are proposed to solve these models. These are based on greedy adding technique and Lagrangian relaxation. At each iteration, the demands are allocated to the facilities using an out-of-kilter method. The performance of the solution techniques are compared to the optimal solutions in a variety of test problems.

[1]  James E. Ward,et al.  A Partial Covering Approach to Siting Response Resources for Major Maritime Oil Spills , 1984 .

[2]  Mark S. Daskin,et al.  A Hierarchical Objective Set Covering Model for Emergency Medical Service Vehicle Deployment , 1981 .

[3]  Warren Walker,et al.  Using the Set-Covering Problem to Assign Fire Companies to Fire Houses , 1974, Oper. Res..

[4]  R. Sridharan A Lagrangian heuristic for the capacitated plant location problem with single source constraints , 1993 .

[5]  David J. Eaton,et al.  Determining Emergency Medical Service Vehicle Deployment in Austin, Texas , 1985 .

[6]  H. Pirkul,et al.  The Maximal Covering Location Problem with Capacities on Total Workload , 1991 .

[7]  D. R. Fulkerson,et al.  An Out-of-Kilter Method for Minimal-Cost Flow Problems , 1960 .

[8]  Peter J. Kolesar,et al.  An Algorithm for the Dynamic Relocation of Fire Companies , 1974, Oper. Res..

[9]  A. M. Geoffrion,et al.  Lagrangean Relaxation Applied to Capacitated Facility Location Problems , 1978 .

[10]  Hasan Pirkul,et al.  The siting of emergency service facilities with workload capacities and backup service , 1988 .

[11]  Mark S. Daskin,et al.  A Maximum Expected Covering Location Model: Formulation, Properties and Heuristic Solution , 1983 .

[12]  J. Current,et al.  Capacitated Covering Models , 1988 .

[13]  S. L. Hakimi,et al.  Optimum Locations of Switching Centers and the Absolute Centers and Medians of a Graph , 1964 .

[14]  Kenneth L. Roberts,et al.  Generalized coverage models and public facility location , 1983 .

[15]  Richard L. Church,et al.  The maximal covering location problem , 1974 .

[16]  K. Jörnsten,et al.  Computational results from a new Lagrangean relaxation algorithm for the capacitated plant location problem , 1991 .

[17]  Charles S. ReVelle,et al.  The Location of Emergency Service Facilities , 1971, Oper. Res..

[18]  R. Church,et al.  Selecting sites for rural health workers. , 1982, Social science & medicine.

[19]  B. M. Khumawala,et al.  An Efficient Branch and Bound Algorithm for the Capacitated Warehouse Location Problem , 1977 .

[20]  G. Cornuéjols,et al.  A comparison of heuristics and relaxations for the capacitated plant location problem , 1991 .

[21]  Umit Akinc Note---Multi-Activity Facility Design and Location Problems , 1985 .

[22]  Geoffrey N. Berlin,et al.  Mathematical analysis of emergency ambulance location , 1974 .