The distance function and Lipschitz classes of mappings between metric spaces

Abstract

We investigate when the local Lipschitz property of the real-valued function g(z) = dY (f(z),A) implies the global Lipschitz property of the mapping f:X Y between the metric spaces (X,dX) and (Y,dY). Here, dY(y,A) denotes the distance of y∈ Y from the non-empty set ⊂eq Y. As a consequence, we find that an analytic function on a uniform domain of a normed space belongs to the Lipschitz class if and only if its modulus satisfies the same condition; in the case of the unit disk this result is proved by K. Dyakonov. We use the recently established version of a classical theorem by Hardy and Littlewood for mappings between metric spaces. This paper is a continuation of the recent article by the author [14].