Metric Lines in Engel-type Groups

Abstract

In the framework of sub-Riemannian Manifolds, a relevant question is: what are the metric lines (i.e., the isometric embedding of the real line)? This article presents a conjecture classifying the metric lines in Carnot groups and takes the first steps in answering this question for arbitrary rank Carnot groups. We classify the metric lines of the Engel-type groups (n) (Theorem 1.2), whose sub-Riemannian structure is defined on a non-integrable distribution of rank n+1. Our approach is a new method, called the sequence method, which we began to develop to study metric lines in the jet space.

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