Smooth Approximation of Lipschitz functions on Riemannian manifolds

Abstract

We show that for every Lipschitz function f defined on a separable Riemannian manifold M (possibly of infinite dimension), for every continuous ε:M (0,+∞), and for every positive number r>0, there exists a C∞ smooth Lipschitz function g:M such that |f(p)-g(p)|≤ε(p) for every p∈ M and Lip(g)≤Lip(f)+r. Consequently, every separable Riemannian manifold is uniformly bumpable. We also present some applications of this result, such as a general version for separable Riemannian manifolds of Deville-Godefroy-Zizler's smooth variational principle.

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