English

Higher integrability for measures satisfying a PDE constraint

Analysis of PDEs 2023-05-24 v2

Abstract

We establish higher integrability estimates for constant-coefficient systems of linear PDEs Aμ=σ, \mathcal{A} \mu = \sigma, where μM(Ω;V)\mu \in \mathcal{M}(\Omega;V) and σM(Ω;W)\sigma\in \mathcal{M}(\Omega;W) are vector measures and the polar dμdμ\frac{\mathrm{d} \mu}{\mathrm{d} |\mu|} is uniformly close to a convex cone of VV intersecting the wave cone of A\mathcal{A} only at the origin. More precisely, we prove local compensated compactness estimates of the form μLp(Ω)μ(Ω)+σ(Ω),ΩΩ. \|\mu\|_{\mathrm{L}^p(\Omega')} \lesssim |\mu|(\Omega) + |\sigma|(\Omega), \qquad \Omega' \Subset \Omega. Here, the exponent pp belongs to the (optimal) range 1p<d/(dk)1 \leq p < d/(d-k), dd is the dimension of Ω\Omega, and kk is the order of A\mathcal{A}. We also obtain the limiting case p=d/(dk)p = d/(d-k) for canceling constant-rank operators. We consider applications to compensated compactness and {applications to the theory of} functions of bounded variation and bounded deformation.

Keywords

Cite

@article{arxiv.2106.03077,
  title  = {Higher integrability for measures satisfying a PDE constraint},
  author = {Adolfo Arroyo-Rabasa and Guido De Philippis and Jonas Hirsch and Filip Rindler and Anna Skorobogatova},
  journal= {arXiv preprint arXiv:2106.03077},
  year   = {2023}
}

Comments

29 pages

R2 v1 2026-06-24T02:52:47.717Z