English

Approximation of Lipschitz functions preserving boundary values

Functional Analysis 2019-02-22 v2 Optimization and Control

Abstract

Given an open subset Ω\Omega of a Banach space and a Lipschitz function u0:ΩR,u_0: \overline{\Omega} \to \mathbb{R}, we study whether it is possible to approximate u0u_0 uniformly on Ω\Omega by CkC^k-smooth Lipschitz functions which coincide with u0u_0 on the boundary Ω\partial \Omega of Ω\Omega and have the same Lipschitz constant as u0.u_0. As a consequence, we show that every 11-Lipschitz function u0:ΩR,u_0: \overline{\Omega} \to \mathbb{R}, defined on the closure Ω\overline{\Omega} of an open subset Ω\Omega of a finite dimensional normed space of dimension n2n \geq 2, and such that the Lipschitz constant of the restriction of u0u_0 to the boundary of Ω\Omega is less than 11, can be uniformly approximated by differentiable 11-Lipschitz functions ww which coincide with u0u_0 on Ω\partial \Omega and satisfy the equation Dw=1\| D w\|_* =1 almost everywhere on Ω.\Omega. This result does not hold in general without assumption on the restriction of u0u_0 to the boundary of Ω\Omega.

Keywords

Cite

@article{arxiv.1810.04205,
  title  = {Approximation of Lipschitz functions preserving boundary values},
  author = {Robert Deville and Carlos Mudarra},
  journal= {arXiv preprint arXiv:1810.04205},
  year   = {2019}
}

Comments

Some cosmetic changes were made in this version

R2 v1 2026-06-23T04:34:00.735Z