English

The Eigenvalue Problem for the $\infty$-Bilaplacian

Analysis of PDEs 2017-11-13 v4

Abstract

We consider the problem of finding and describing minimisers of the Rayleigh quotient Λ:=infuW2,(Ω){0}ΔuL(Ω)uL(Ω), \Lambda_\infty \, :=\, \inf_{u\in \mathcal{W}^{2,\infty}(\Omega)\setminus\{0\} }\frac{\|\Delta u\|_{L^\infty(\Omega)}}{\|u\|_{L^\infty(\Omega)}}, where ΩRn\Omega \subseteq \mathbb{R}^n is a bounded C1,1C^{1,1} domain and W2,(Ω)\mathcal{W}^{2,\infty}(\Omega) is a class of weakly twice differentiable functions satisfying either u=0u=0 or u=Du=0u=|\mathrm{D} u|=0 on Ω\partial \Omega. Our first main result, obtained through approximation by LpL^p-problems as pp\to \infty, is the existence of a minimiser uW2,(Ω)u_\infty \in \mathcal{W}^{2,\infty}(\Omega) satisfying {ΔuΛSgn(f) a.e. in Ω,Δf=μ in D(Ω), \left\{ \begin{array}{ll} \Delta u_\infty \, \in \, \Lambda_\infty \mathrm{Sgn}(f_\infty) & \text{ a.e. in }\Omega, \\ \Delta f_\infty \, =\, \mu_\infty & \text{ in }\mathcal{D}'(\Omega), \end{array} \right. for some fL1(Ω)BVloc(Ω)f_\infty\in L^1(\Omega)\cap BV_{\text{loc}}(\Omega) and a measure μM(Ω)\mu_\infty \in \mathcal{M}(\Omega), for either choice of boundary conditions. Here Sgn is the multi-valued sign function. We also study the dependence of the eigenvalue Λ\Lambda_\infty on the domain, establishing the validity of a Faber-Krahn type inequality: among all C1,1C^{1,1} domains with fixed measure, the ball is a strict minimiser of ΩΛ(Ω)\Omega \mapsto \Lambda_\infty(\Omega). This result is shown to hold true for either choice of boundary conditions and in every dimension.

Keywords

Cite

@article{arxiv.1703.03648,
  title  = {The Eigenvalue Problem for the $\infty$-Bilaplacian},
  author = {Nikos Katzourakis and Enea Parini},
  journal= {arXiv preprint arXiv:1703.03648},
  year   = {2017}
}

Comments

24 pages; accepted; Journal: Nonlinear Differential Equations and Applications

R2 v1 2026-06-22T18:42:14.681Z