English

Higher Order Lipschitz Sandwich Theorems

Classical Analysis and ODEs 2025-02-21 v3 Numerical Analysis Differential Geometry Numerical Analysis

Abstract

We investigate the consequence of two Lip(γ)(\gamma) functions, in the sense of Stein, being close throughout a subset of their domain. A particular consequence of our results is the following. Given K0>ε>0K_0 > \varepsilon > 0 and γ>η>0\gamma > \eta > 0 there is a constant δ=δ(γ,η,ε,K0)>0\delta = \delta(\gamma,\eta,\varepsilon,K_0) > 0 for which the following is true. Let ΣRd\Sigma \subset \mathbb{R}^d be closed and f,h:ΣRf , h : \Sigma \to \mathbb{R} be Lip(γ)(\gamma) functions whose Lip(γ)(\gamma) norms are both bounded above by K0K_0. Suppose BΣB \subset \Sigma is closed and that ff and hh coincide throughout BB. Then over the set of points in Σ\Sigma whose distance to BB is at most δ\delta we have that the Lip(η)(\eta) norm of the difference fhf-h is bounded above by ε\varepsilon. More generally, we establish that this phenomenon remains valid in a less restrictive Banach space setting under the weaker hypothesis that the two Lip(γ)(\gamma) functions ff and hh are only close in a pointwise sense throughout the closed subset BB. We require only that the subset Σ\Sigma be closed; in particular, the case that Σ\Sigma is finite is covered by our results. The restriction that η<γ\eta < \gamma is sharp in the sense that our result is false for η:=γ\eta := \gamma.

Keywords

Cite

@article{arxiv.2404.06849,
  title  = {Higher Order Lipschitz Sandwich Theorems},
  author = {Terry Lyons and Andrew D. McLeod},
  journal= {arXiv preprint arXiv:2404.06849},
  year   = {2025}
}

Comments

Version Accepted for Publication in the Journal of the London Mathematical Society. arXiv admin note: substantial text overlap with arXiv:2205.07495

R2 v1 2026-06-28T15:49:42.040Z