The unique limit of the Glimm-Lax construction for Sobolev data and obstructions to 1-d convex integration

Abstract

We consider a genuinely nonlinear 1-d system of hyperbolic conservation laws with two unknowns. A famous construction of Glimm & Lax shows that global-in-time "Glimm-Lax" weak entropy solutions exist in this setting for any initial data with small L∞ norm [Mem. Amer. Math. Soc. (1970), no. 101]. Recent work in the L1-stability theory by Bressan, Marconi & Vaidya has given the first partial uniqueness and stability results for these solutions [Arch. Ration. Mech. Anal. (2025), vol. 249]. In this paper, we build on these results by combining them with recent advances in the L2-theory. We show that solutions with initial data in the Sobolev space Hs for s>0 are unique in the full class of Glimm--Lax solutions that decay in total variation at a rate of 1/t. As a secondary result, our techniques are also used to show the recent non-uniqueness result of Chen, Vasseur & Yu for continuous solutions (arxiv:2407.02927) cannot extend to Cα solutions for α > 1/2, alongside some appropriate fractional Sobolev spaces Ws,p. An auxiliary result of independent interest is the development of a weighted relative entropy contraction for perturbations of rarefaction waves.