On Traffic Flow with Nonlocal Flux: a Relaxation Representation

Abstract

We consider a conservation law model of traffic flow, where the velocity of each car depends on a weighted average of the traffic density ahead. The averaging kernel is of exponential type: w(s)= -1 e-s/. By a transformation of coordinates, the problem can be reformulated as a 2× 2 hyperbolic system with relaxation. Uniform BV bounds on the solution are thus obtained, independent of the scaling parameter . Letting 0, the limit yields a weak solution to the corresponding conservation law t + ( v())x=0. In the case where the velocity v()= a-b is affine, using the Hardy-Littlewood rearrangement inequality we prove that the limit is the unique entropy-admissible solution to the scalar conservation law.