Higher Order Lipschitz Sandwich Theorems

Abstract

We investigate the consequence of two Lip(γ) 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 > > 0 and γ > η > 0 there is a constant δ = δ(γ,η,,K0) > 0 for which the following is true. Let ⊂ Rd be closed and f , h : R be Lip(γ) functions whose Lip(γ) norms are both bounded above by K0. Suppose B ⊂ is closed and that f and h coincide throughout B. Then over the set of points in whose distance to B is at most δ we have that the Lip(η) norm of the difference f-h is bounded above by . 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) functions f and h are only close in a pointwise sense throughout the closed subset B. We require only that the subset be closed; in particular, the case that is finite is covered by our results. The restriction that η < γ is sharp in the sense that our result is false for η := γ.

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