Another regularizing property of the 2D eikonal equation
Analysis of PDEs
2025-04-30 v1
Abstract
A weak solution of the two-dimensional eikonal equation amounts to a vector field such that a.e. and in . It is known that, if has some low regularity, e.g., continuous or , then is automatically more regular: locally Lipschitz outside a locally finite set. A long-standing conjecture by Aviles and Giga, if true, would imply the same regularizing effect under the Besov regularity assumption for . In this note we establish that regularizing effect in the borderline case , above which the Besov regularity assumption implies continuity. If the domain is a disk and satisfies tangent boundary conditions, we also prove this for slightly below .
Cite
@article{arxiv.2504.20933,
title = {Another regularizing property of the 2D eikonal equation},
author = {Xavier Lamy and Andrew Lorent and Guanying Peng},
journal= {arXiv preprint arXiv:2504.20933},
year = {2025}
}