Abstract This paper is concerned with a problem of finding an optimal path in a network for a single service facility which moves between fixed points, and continuously examines the potential service of a set of existing facilities located on the network. The existing facilities may be discretely distributed at the nodes of the network, or may also be continuously distributed along the links of the network. Two types of objectives are examined. The first is to find a path that minimizes the sum of the weighted distances between the moving service facility and the existing facilities over all instants of time during the travel period. The second is to find a path that minimizes the sum of the farthest weighted distances between the moving service facility and the existing facilities over all instants of time during the travel period. By appropriately redefining link lengths, it is shown that standard shortest-path algorithms can be applied to solve these problems. The methodology is illustrated via numerical examples.
[1]
R. L. Francis,et al.
State of the Art-Location on Networks: A Survey. Part II: Exploiting Tree Network Structure
,
1983
.
[2]
Timothy J. Lowe,et al.
Location on Networks: A Survey. Part I: The p-Center and p-Median Problems
,
1983
.
[3]
Pitu B. Mirchandani,et al.
Location on networks : theory and algorithms
,
1979
.
[4]
Rajan Batta,et al.
Optimal Obnoxious Paths on a Network: Transportation of Hazardous Materials
,
1988,
Oper. Res..
[5]
Oded Berman,et al.
Optimal Minimax Path of a Single Service Unit on a Network to Nonservice Destinations
,
1987,
Transp. Sci..
[6]
Fred W. Glover,et al.
A New Polynomially Bounded Shortest Path Algorithm
,
1985,
Oper. Res..
[7]
Oded Berman,et al.
Optimal Path of a Single Service Unit on a Network to a “Nonemergency” Destination
,
1983
.