Add to ORKGIn this paper we study the notion of geodesic curvature of smooth horizontal curves parametrized by arc lenght in the Heisenberg group, that is the simplest sub-Riemannian structure. Our goal is to give a metric interpretation of this notion of geodesic curvature as the first corrective term in the Taylor expansion of the distance between two close points of the curve
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
The metric normal is an useful tool to study geometric invariants of surfaces. In particular we can ...
International audienceIn this paper we study the notion of geodesic curvature of smooth horizontal c...
International audienceIn this paper we study the notion of geodesic curvature of smooth horizontal c...
International audienceIn this paper we study the notion of geodesic curvature of smooth horizontal c...
In this paper we study the notion of geodesic curvature of smooth horizontal curves parametrized by ...
We introduce a notion of geodesic curvature kζ for a smooth horizontal curve in a three-dimensional ...
26 pagesWe introduce a notion of geodesic curvature $k_{\zeta}$ for a smooth horizontal curve $\zeta...
26 pagesWe introduce a notion of geodesic curvature $k_{\zeta}$ for a smooth horizontal curve $\zeta...
26 pagesWe introduce a notion of geodesic curvature $k_{\zeta}$ for a smooth horizontal curve $\zeta...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
The metric normal is an useful tool to study geometric invariants of surfaces. In particular we can ...
International audienceIn this paper we study the notion of geodesic curvature of smooth horizontal c...
International audienceIn this paper we study the notion of geodesic curvature of smooth horizontal c...
International audienceIn this paper we study the notion of geodesic curvature of smooth horizontal c...
In this paper we study the notion of geodesic curvature of smooth horizontal curves parametrized by ...
We introduce a notion of geodesic curvature kζ for a smooth horizontal curve in a three-dimensional ...
26 pagesWe introduce a notion of geodesic curvature $k_{\zeta}$ for a smooth horizontal curve $\zeta...
26 pagesWe introduce a notion of geodesic curvature $k_{\zeta}$ for a smooth horizontal curve $\zeta...
26 pagesWe introduce a notion of geodesic curvature $k_{\zeta}$ for a smooth horizontal curve $\zeta...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
We present a notion of geodesic curvature for smooth horizontal curves in a contact sub-Riemannian m...
The metric normal is an useful tool to study geometric invariants of surfaces. In particular we can ...