TY - JOUR
T1 - Solving the median shortest path problem in the planning and design of urban transportation networks using a vector labeling algorithm
AU - Nepal, Kali Prasad
AU - Park, Dongjoo
PY - 2005/4
Y1 - 2005/4
N2 - This paper proposes an alternative algorithm to solve the median shortest path problem (MSPP) in the planning and design of urban transportation networks. The proposed vector labeling algorithm is based on the labeling of each node in terms of a multiple and conflicting vector of objectives which deletes cyclic, infeasible and extreme-dominated paths in the criteria space imposing cyclic break (CB), path cost constraint (PCC) and access cost parameter (ACP) respectively. The output of the algorithm is a set of Pareto optimal paths (POP) with an objective vector from predetermined origin to destination nodes. Thus, this paper formulates an algorithm to identify a non-inferior solution set of POP based on a non-dominated set of objective vectors that leaves the ultimate decision to decision-makers. A numerical experiment is conducted using an artificial transportation network in order to validate and compare results. Sensitivity analysis has shown that the proposed algorithm is more efficient and advantageous over existing solutions in terms of computing execution time and memory space used.
AB - This paper proposes an alternative algorithm to solve the median shortest path problem (MSPP) in the planning and design of urban transportation networks. The proposed vector labeling algorithm is based on the labeling of each node in terms of a multiple and conflicting vector of objectives which deletes cyclic, infeasible and extreme-dominated paths in the criteria space imposing cyclic break (CB), path cost constraint (PCC) and access cost parameter (ACP) respectively. The output of the algorithm is a set of Pareto optimal paths (POP) with an objective vector from predetermined origin to destination nodes. Thus, this paper formulates an algorithm to identify a non-inferior solution set of POP based on a non-dominated set of objective vectors that leaves the ultimate decision to decision-makers. A numerical experiment is conducted using an artificial transportation network in order to validate and compare results. Sensitivity analysis has shown that the proposed algorithm is more efficient and advantageous over existing solutions in terms of computing execution time and memory space used.
KW - Median shortest path problem (MSPP)
KW - Pareto optimal paths (POP)
KW - Transportation networks
KW - Vector labeling algorithm
UR - http://www.scopus.com/inward/record.url?scp=17744372938&partnerID=8YFLogxK
U2 - 10.1080/03081060500053509
DO - 10.1080/03081060500053509
M3 - Article
AN - SCOPUS:17744372938
SN - 0308-1060
VL - 28
SP - 113
EP - 133
JO - Transportation Planning and Technology
JF - Transportation Planning and Technology
IS - 2
ER -