Well-posedness for a monotone solver for traffic junctions

Abstract

In this paper we aim at proving well-posedness of solutions obtained as vanishing viscosity limits for the Cauchy problem on a traffic junction where m incoming and n outgoing roads meet. The traffic on each road is governed by a scalar conservation law h,t + fh(h)x = 0, for h∈ \1,…, m+n\. Our proof relies upon the complete description of the set of road-wise constant solutions and its properties, which is of some interest on its own. Then we introduce a family of Kruzhkov-type adapted entropies at the junction and state a definition of admissible solution in the same spirit as in diehl, ColomboGoatinConstraint, scontrainte, ACtransmission, germes.