Metric lines in Jet Space

Abstract

Given a sub-Riemannian manifold, a relevant question is: what are the metric lines (isometric embedding of the real line)? The space of k-jets of a real function of one real variable x, denoted by Jk(R,R), admits the structure of a Carnot group, as every Carnot group Jk(R,R) is a sub-Riemannian Manifold. This work is devoted to provide a partial result about the classification of the metric lines in Jk(R,R). The method to prove the main Theorems is to use an intermediate 3-dimensional sub-Riemannian space R3F lying between the group Jk(R,R) and the Euclidean space R2 Jk(R,R) / [Jk(R,R),Jk(R,R)].

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