English

The Ekeland--Nirenberg Variational Problem:A Sharp Positivity Threshold and Extensions

Analysis of PDEs 2026-05-12 v1

Abstract

We study the Ekeland--Nirenberg variational problem in the two-dimensional diagonal family Ja,c,d(u)=\Rp2(uxy2+aux2+cuy2+du2)\ddx\ddy,a,c,d>0, J_{a,c,d}(u)=\int_{\Rp^2}\bigl(u_{xy}^2+a u_x^2+c u_y^2+d u^2\bigr)\dd x\dd y, \qquad a,c,d>0, under the constraint u(0,0)=1u(0,0)=1. If ua,c,du_{a,c,d} is the unique minimizer and Ka,c,dK_{a,c,d} is its cosine kernel, we prove the sharp classification Ka,c,d>0 on \Rp2ua,c,d>0 on \Rp2dac. K_{a,c,d}>0 \hbox{ on } \Rp^2\quad\Longleftrightarrow\quad u_{a,c,d}>0 \hbox{ on } \Rp^2\quad\Longleftrightarrow\quad d\le ac . Thus every supercritical triple d>acd>ac produces sign change. We also prove local sign-change stability under small two-dimensional non-diagonal perturbations and a sharp product-type nn-dimensional diagonal threshold. The domain and evolution results are stated in precise auxiliary settings: a free-boundary capacity formulation for domains and a selected decaying branch of the second-order evolution equation.

Cite

@article{arxiv.2605.08700,
  title  = {The Ekeland--Nirenberg Variational Problem:A Sharp Positivity Threshold and Extensions},
  author = {Qi Guo and Xueping Huang and Yi Huang},
  journal= {arXiv preprint arXiv:2605.08700},
  year   = {2026}
}
R2 v1 2026-07-01T12:59:32.413Z