EULER–LAGRANGE CORRESPONDENCE OF GENERALIZED BURGERS CELLULAR AUTOMATON
From MaRDI portal
Publication:5700018
DOI10.1142/S0129183104005917zbMath1079.90517arXivnlin/0311057MaRDI QIDQ5700018
Katsuhiro Nishinari, Junta Matsukidaira
Publication date: 27 October 2005
Published in: International Journal of Modern Physics C (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/nlin/0311057
Traffic problems in operations research (90B20) Dynamical aspects of cellular automata (37B15) Applications of queueing theory (congestion, allocation, storage, traffic, etc.) (60K30) Variational principles of physics (49S05)
Related Items (2)
AN ADAPTIVE EBCA MODEL PROBING THE PROBLEM OF RIDING AGAINST THE TRAFFIC FLOW ⋮ Multi-value cellular automata model for mixed bicycle flow
Cites Work
- Unnamed Item
- Additive conserved quantities in discrete-time lattice dynamical systems
- On discrete soliton equations related to cellular automata
- Multi-value cellular automaton models and metastable states in a congested phase
- A Lagrange representation of cellular automaton traffic-flow models
- Cellular automaton rules conserving the number of active sites
- Box and ball system with a carrier and ultradiscrete modified KdV equation
- Box and ball system as a realization of ultradiscrete nonautonomous KP equation
- Two-Dimensional Burgers Cellular Automaton
- Analytical properties of ultradiscrete Burgers equation and rule-184 cellular automaton
This page was built for publication: EULER–LAGRANGE CORRESPONDENCE OF GENERALIZED BURGERS CELLULAR AUTOMATON
