Abstract
Recently, the authors have formulated new models for the location of congested facilities, so to maximize population covered by service with short queues or waiting time. In this paper, we present an extension of these models, which seeks to cover all population and includes server allocation to the facilities. This new model is intended for the design of service networks, including health and EMS services, banking or distributed ticket-selling services. As opposed to the previous Maximal Covering model, the model presented here is a Set Covering formulation, which locates the least number of facilities and allocates the minimum number of servers (clerks, tellers, machines) to them, so to minimize queuing effects. For a better understanding, a first model is presented, in which the number of servers allocated to each facility is fixed. We then formulate a Location Set Covering model with a variable (optimal) number of servers per service center (or facility). A new heuristic, with good performance on a 55-node network, is developed and tested.
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References
R. Batta, Single server queueing-location models with rejection, Transportation Science 22 (1988) 209-216.
R. Batta, A queueing-location model with expected service time dependent queueing disciplines, European Journal of Operational Research 39 (1989) 192-205.
R. Batta, R. Larson and A. Odoni, A single-server priority queueing-location model, Networks 8 (1988) 87-103.
O. Berman and R. Larson, Optimal 2-facility network districting in the presence of queueing, Transportation Science 19 (1985) 261-277.
O. Berman, R. Larson and S. Chiu, Optimal server location on a network operating as a M/G/1 Queue, Operations Research 12 (1985) 746-771.
O. Berman, R. Larson and C. Parkan, The stochastic queue p-median location problem, Transportation Science 21 (1987) 207-216.
O. Berman and R. Mandowsky, Location-allocation on congested networks, European Journal of Operational Research 26 (1986) 238-250.
R. Church and C. ReVelle, The Maximal Covering Location Problem, Papers of the Regional Science Association 32 (1974) 101-118.
G. Cornuejols, R. Sridharan and J. Thizy, A comparison of heuristics and relaxations for the capacitated plant location problem, European Journal of Operational Research 50 (1991) 280-297.
J. Current and J. Storbeck, Capacitated covering models, Environment and Planning B 15 (1988) 153-164.
M.S. Daskin, A maximum expected covering location model: Formulation, properties and heuristic solution, Transportation Science 17 (1983) 48-70.
P. Davis and T. Ray, A branch and bound algorithm for the Capacitated Facilities Location Problem, Naval Research Logistics Quarterly 16 (1969) 331-334.
P. Densham and G. Rushton, Strategies for solving large location-allocation problems by heuristic methods, Environment and Planning A 24 (1992) 289-304.
R. Galvão, The use of Lagrangean relaxation in the solution of unicapacitated facility location problems, Location Science 1(1) (1993) 57-70.
A. Geoffrion, Lagrangean relaxation for integer programming, Mathematical Programming Study 2 (1974) 82-114.
R. Gerrard and R. Church, Closest assignment constraints and location models: Properties and structure, Location Science 4 (1996) 251-270.
S.L. Hakimi, Optimal locations of switching centers and the absolute centers and medians of a graph, Operations Research 12 (1964) 450-459.
R.C. Larson, A hypercube queueing model for facility location and redistricting in urban emergency services, Computers and Operations Research 1 (1974) 67-95.
V. Marianov and C. ReVelle, The Queueing Probabilistic Location Set Covering Problem and some extensions, Socio-Economic Planning Sciences 28 (1994) 167-178.
V.Marianov and C. ReVelle, The QueueingMaximum Availability Location Problem, European Journal of Operational Research 93 (1996) 110-120.
V. Marianov and D. Serra, Probabilistic, maximal covering location-allocation models for congested systems, Journal of Regional Science 38 (1998) 401-424.
H. Pirkul and D. Schilling, The maximal covering location problem with capacities on total workload, Management Science 37 (1991) 233-248.
C. ReVelle, Facility siting and integer-friendly programming, European Journal of Operational Research 65 (1993) 147-158.
C. ReVelle and K. Hogan, A reliability-constrained siting model with local estimates of busy fractions, Environment and Planning B: Planning and Design 15 (1988) 143-152.
C. ReVelle and K. Hogan, TheMaximum Reliability Location Problemand ?-Reliable p-Center Problem: Derivatives of the Probabilistic Location Set Covering Problem, Annals of Operations Research 18 (1989) 155-174.
C. ReVelle and S. Swain, Central facilities location, Geographical Analysis 2 (1970) 30-42.
G. Rogeski and C. ReVelle, Central facilities location under an investment constraint, Geographical Analysis 2 (1975) 343-353.
K. Rosing, An empirical investigation of the effectiveness of a vertex substitution heuristic, Environment and Planning B 24 (1997) 59-67.
K. Rosing and C. ReVelle, Heuristic concentration: Two stage solution construction, European Journal of Operational Research 97 (1997) 75-86.
K. Rosing, C. ReVelle and H. Rosing-Vogelaar, The p-median model and its linear programming relaxation: An approach to large problems, Journal of the Operational Research Society 30 (1979) 815-823.
R. Swain, A parametric decomposition algorithm for the solution of uncapacitated location problems, Management Science 21 (1974) 189-198.
M. Tietz and P. Bart, Heuristic methods for estimating the generalized vertex median of a weigthed graph, Operations Research 16 (1968) 955-965.
C. Toregas, R. Swain, C. ReVelle and L. Bergman, The location of emergency service facilities, Operations Research 19 (1971) 1363-1373.
C.Wagner and F. Falkston, The optimal nodal location of public facilities with price sensitive demand, Geographical Analysis 7 (1975) 69-79.
R.Wolff, Stochastic Modeling and the Theory of Queues (Prentice-Hall, Englewood Cliffs, NJ, 1989).
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Marianov, V., Serra, D. Location–Allocation of Multiple-Server Service Centers with Constrained Queues or Waiting Times. Annals of Operations Research 111, 35–50 (2002). https://doi.org/10.1023/A:1020989316737
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DOI: https://doi.org/10.1023/A:1020989316737