In this paper we present heuristic algorithms for the period vehicle routing problem, the problem of designing vehicle routes to meet required service levels for customers and minimize distribution costs over a given several-day period of time. These heuristic algorithms are based on an initial choice of customer delivery days which meet the service level requirements, followed by an interchange procedure in an attempt to minimize distribution costs. The heuristic algorithms represent distribution costs by replacing the vehicle routing problem for each day of the period by (I) a median problem and (II) a traveling salesman problem. Computational results and comparisons are given for the algorithms, based on test problems derived from the literature with up to 126 customers. The largest of these problems is the one given and solved by Russell and Igo. The solution obtained for this problem by the heuristic algorithms shows an improvement of 13% over the previous best solution. (Author/TRRL)
[1]
Thomas L. Magnanti,et al.
Implementing vehicle routing algorithms
,
1977,
Networks.
[2]
G. Clarke,et al.
Scheduling of Vehicles from a Central Depot to a Number of Delivery Points
,
1964
.
[3]
Nicos Christofides,et al.
EXPECTED DISTANCES IN DISTRIBUTION PROBLEMS
,
1969
.
[4]
Brian W. Kernighan,et al.
An Effective Heuristic Algorithm for the Traveling-Salesman Problem
,
1973,
Oper. Res..
[5]
Nicos Christofides,et al.
The Loading Problem
,
1971
.
[6]
R. Russell,et al.
An assignment routing problem
,
1979,
Networks.
[7]
Robert A. Russell,et al.
Technical Note - An Effective Heuristic for the M-Tour Traveling Salesman Problem with Some Side Conditions
,
1977,
Oper. Res..
[8]
Lawrence Bodin,et al.
Networks and vehicle routing for municipal waste collection
,
1974,
Networks.