Elements for a metric tangential calculus

Abstract

The metric jets, introduced in the first chapter, generalize the jets (at order one) of Charles Ehresmann. In short, for a "good" map f (said to be "tangentiable" at a), we define its metric jet tangent at a (composed of all the maps which are locally lipschitzian at a and tangent to f at a) called the "tangential" of f at a, and denoted Tfa (the domain and codomain of f being metric spaces). Furthermore, guided by the heuristic example of the metric jet Tfa, tangent to a map f differentiable at a, which can be canonically represented by the unique continuous affine map it contains, we will extend, in the second chapter, into a specific metric context, this property of representation of a metric jet.This yields a lot of relevant examples of such representations.