On Second-Order L∞ Variational Problems with Lower-Order Terms

Abstract

In this paper we study 2nd order L∞ 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 ⊂eq Rn and H : ×( R × Rn × Rn2s ) R, we consider the functional \[ E∞(u, O) := Oess1mm H (·,u, D u, D2u ) , \ \ u∈ W2,∞(), \ O ⊂eq measurable. \] We establish the existence of minimisers subject to (first-order) Dirichlet data on ∂ under natural assumptions, and, when n=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 \ \ H X(·,u, D u, D2u): D( H(·,u, D u, D2u)) D( H(·,u, D u, D2u))=0\ \ in . 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.

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