Irregular Diffusions and Loss of Regularity in Polyconvex Gradient Flows
Abstract
We investigate diffusion-type partial differential equations that are irregular in the sense that they admit weak solutions which are nowhere smooth, even for prescribed smooth data. By reformulating these equations as first-order partial differential relations and adapting the method of convex integration, we develop a construction scheme based on new geometric structures, referred to as -configurations, together with a simplified structural hypothesis on the diffusion functions, termed Condition . Under this condition, we show that the associated initial and boundary value problems with certain smooth initial-boundary data admit infinitely many Lipschitz weak solutions that are nowhere . We further analyze specific -configurations and establish nondegeneracy conditions that are essential for verifying Condition . As an application, we construct examples of strongly polyconvex energy functionals whose gradient flows generate irregular diffusion equations, thereby revealing a failure of regularity and uniqueness even within the class of polyconvex gradient flows.
Cite
@article{arxiv.2601.01035,
title = {Irregular Diffusions and Loss of Regularity in Polyconvex Gradient Flows},
author = {Bin Guo and Seonghak Kim and Baisheng Yan},
journal= {arXiv preprint arXiv:2601.01035},
year = {2026}
}
Comments
48 pages