Minimum weight paths in time‐dependent networks
- 1 May 1991
- Vol. 21 (3) , 295-319
- https://doi.org/10.1002/net.3230210304
Abstract
We investigate the minimum weight path problem in networks whose link weights and link delays are both functions of time. We demonstrate that, in general, there exist cases in which no finite path is optimal leading us to define an infinite path (naturally, containing loops) in such a way that the minimum weight problem always has a solution. We also characterize the structure of an infinite optimal path. In many practical cases, finite optimal paths do exist. We formulate a criterion that guarantees the existence of a finite optimal path and develop an algorithm to find such a path. Some special cases, e.g., optimal loopless paths, are also discussed.Keywords
This publication has 7 references indexed in Scilit:
- Shortest-path and minimum-delay algorithms in networks with time-dependent edge-lengthJournal of the ACM, 1990
- Shortest‐path algorithms: Taxonomy and annotationNetworks, 1984
- A Class of Continuous Network Flow ProblemsMathematics of Operations Research, 1982
- Shortest route with time dependent length of edges and limited delay possibilities in nodesMathematical Methods of Operations Research, 1977
- Determination of shortest path in a network with time-dependent edge-lengths1Mathematische Operationsforschung und Statistik, 1972
- An Appraisal of Some Shortest-Path AlgorithmsOperations Research, 1969
- The shortest route through a network with time-dependent internodal transit timesJournal of Mathematical Analysis and Applications, 1966