English

Partial regularity and higher integrability for A-quasiconvex variational problems

Analysis of PDEs 2026-04-09 v2

Abstract

We prove that minimizers of variational problems on open sets ΩRn\Omega \subset \mathbb{R}^n \mboxminimizeE(v)=Ωf(v(x))dxfor Av=0, \mbox{minimize}\quad \mathcal E(v)=\int_\Omega f(v(x))\mathrm{d} x\quad\text{for } \mathscr{A} v=0, are partially continuous provided that the integrands ff are strongly A\mathscr{A}-quasiconvex in a suitable sense. We consider pp-growth problems with 1<p<1<p<\infty, linear constant rank PDE operators A\mathscr{A} on Rn\mathbb{R}^n between vector spaces VV and WW, and Dirichlet boundary conditions, in the sense that admissible fields are of the form v=v0+φv=v_0+\varphi, with A\mathscr{A}-free φCc(Ω,V)\varphi\in C_c^\infty(\Omega,V). Our analysis also covers the ``potentials case'' \mboxminimizeF(u)=Ωf(Bu(x))dxfor uu0+Cc(Ω,U), \mbox{minimize}\quad \mathcal F(u)=\int_\Omega f(\mathscr{B} u(x))\mathrm{d} x\quad\text{for } u\in u_0+ C_c^\infty(\Omega,U), where B\mathscr{B} is another linear constant rank PDE operator on Rn\mathbb{R}^n between vector spaces U,VU,V. We also prove appropriate higher integrability of minimizers for both types of problems. In addition, our approach covers non-autonomous integrands f(x,v(x))f(x,v(x)) or f(x,Bu(x))f(x,\mathscr{B} u(x)).

Keywords

Cite

@article{arxiv.2412.10363,
  title  = {Partial regularity and higher integrability for A-quasiconvex variational problems},
  author = {Zhuolin Li and Bogdan Raiţă},
  journal= {arXiv preprint arXiv:2412.10363},
  year   = {2026}
}

Comments

38 pages. Some minor errors were corrected, and the proof of the partial regularity was shortened

R2 v1 2026-06-28T20:34:30.202Z