English

On Second-Order $L^\infty$ Variational Problems with Lower-Order Terms

Analysis of PDEs 2025-01-14 v2

Abstract

In this paper we study 22nd order LL^\infty variational problems, through seeking to minimise a supremal functional involving the Hessian of admissible functions as well as lower-order terms. Specifically, given a bounded domain ΩRn\Omega\subseteq \mathbb R^n and H:Ω×(R×Rn×Rsn2)R\mathrm H : \Omega\times\big(\mathbb R \times\mathbb R^n \times \mathbb R^{n^{\otimes2}}_s \big) \to \mathbb R, we consider the functional E(u,O):=esssupOH(,u,Du,D2u),  uW2,(Ω), OΩ measurable. \mathrm{E}_\infty(u, \mathcal{O}) :=\underset{ \mathcal{O}}{\mathrm{ess}\sup}\hspace{1mm}\mathrm H (\cdot,u,\mathrm D u,\mathrm D^2u ) , \ \ u\in W^{2,\infty}(\Omega), \ \mathcal{O} \subseteq \Omega \text{ measurable}. We establish the existence of minimisers subject to (first-order) Dirichlet data on Ω\partial \Omega under natural assumptions, and, when n=1n=1, we also show the existence of absolute minimisers. We further derive a necessary fully nonlinear PDE of third-order which arises as the analogue of the Euler-Lagrange equation for absolute minimisers, and is given by   HX(,u,Du,D2u):D(H(,u,Du,D2u))D(H(,u,Du,D2u))=0   in Ω. \ \ \mathrm H_{\mathrm X}(\cdot,u,\mathrm D u,\mathrm D^2u): \mathrm D\big(\mathrm H(\cdot,u,\mathrm D u,\mathrm D^2u)\big)\otimes \mathrm D\big(\mathrm H(\cdot,u,\mathrm D u,\mathrm D^2u)\big)=0\ \ \text{ in }\Omega. We then rigorously derive this PDE from smooth absolute minimisers, and prove the existence of generalised D-solutions to the (first-order) Dirichlet problem. Our work generalises the key results obtained in [26] which first studied problems of this type with pure Hessian dependence only, providing at the same time considerably simpler streamlined proofs.

Keywords

Cite

@article{arxiv.2412.11701,
  title  = {On Second-Order $L^\infty$ Variational Problems with Lower-Order Terms},
  author = {Ben Dutton and Nikos Katzourakis},
  journal= {arXiv preprint arXiv:2412.11701},
  year   = {2025}
}

Comments

21 pages

R2 v1 2026-06-28T20:36:51.949Z