Metrically differentiable set-valued functions and their local linear approximants

Abstract

A new notion of metric differentiability of set-valued functions at a point is introduced in terms of right and left limits of special set-valued metric divided differences of first order. A local metric linear approximant of a metrically differentiable set-valued function at a point is defined and studied. This local approximant may be regarded as a special realization of the set-valued Euler approximants of M.~S.~Nikolskii and the directives of Z.~Artstein. Error estimates for the local metric linear approximant are obtained. In particular, second order approximation is derived for a class of ``strongly'' metrically differentiable set-valued maps.