Divergence-form equations admitting nowhere C1 Lipschitz weak solutions

Abstract

We study a class of partial differential equations in divergence form that admit highly irregular Lipschitz weak solutions. By reformulating these divergence-form equations as a first-order partial differential relation and adapting the convex integration scheme recently developed in GKY26 for irregular diffusion equations, we show that the same structural Condition~ON introduced there also ensures the existence of Lipschitz weak solutions that are nowhere C1 for the corresponding time-independent equations in bounded domains, under suitable boundary data. In particular, for the smooth strongly polyconvex functions on R2× n constructed in that paper for all n 2, the associated Euler--Lagrange equations admit Lipschitz weak solutions that are nowhere C1 and satisfy zero boundary conditions in any bounded domain of Rn. Our approach relies on new building blocks constructed from the same wave cone and TN-configurations employed in the analysis of diffusion equations.