Wardrop equilibria : long-term variant, degenerate anisotropic PDEs and numerical approximations
Provides theoretical foundations and numerical methods for modeling traffic equilibrium in dense networks, but the results are incremental extensions of existing work.
The authors establish equivalence between a continuous minimization problem for congested traffic and an anisotropic degenerate elliptic PDE, prove Sobolev regularity for minimizers in particular cases, and extend prior analysis to general settings with numerical simulations.
As shown in [15], under some structural assumptions, working on congested traffic problems in general and increasingly dense networks leads, at the limit by Γ-convergence, to continuous minimization problems posed on measures on generalized curves. Here, we show the equivalence with another problem that is the variational formulation of an anisotropic, degenerate and elliptic PDE. For particular cases, we prove a Sobolev regularity result for the minimizers of the minimization problem despite the strong degeneracy and anisotropy of the Euler-Lagrange equation of the dual. We extend the analysis of [6] to the general case. Finally, we use the method presented in [5] to make numerical simulations.