DYNAMIC NETWORK EQUILIBRIUM PROBLEM FORMULATED AS AN INFINITE DIMENSIONAL VARIATIONAL INEQUALITY PROBLEM

The dynamic network equilibrium problem is to find time-varying network flows given an origin-destination (O-D) demand departure rate for a time period in a congested network. In this paper, the authors formulate the problem mathematically as an infinite dimensional variational inequality problem. Then for the computational purpose it is converted into a finite dimensional variational inequality problem through a discretization. A standard simplicial projection method is adapted so that the solution method is highly decomposable by each origin-destination (O-D) and time period (interval).

• Supplemental Notes:
  • Publication Date: 1993 Published By: Universite de Montreal, Centre de recherche sur les transports, Montreal
• Corporate Authors:

  Universite de Montreal

  Centre de Recherche sur Les Transports
  C.P. 6128 Succursale Centre-ville
  Montreal H3C 3J7, Quebec  Canada 
• Authors:
  • Wu, Jia Hao
• Publication Date: 1993

Language

• English

Media Info

• Pagination: 19 p.
• Serial:
  • Publication / Centre de recherche sur les transports ; 952
  • Publisher: Universite de Montreal

Subject/Index Terms

• TRT Terms: Traffic assignment
• Subject Areas: Operations and Traffic Management;

Filing Info

• Accession Number: 00785171
• Record Type: Publication
• Source Agency: UC Berkeley Transportation Library
• Report/Paper Numbers: CRT-952
• Files: PATH
• Created Date: Nov 17 2000 12:00AM