Krakowski, Krzysztof; Silva Leite, Fatima

Author(s)

Krakowski, Krzysztof

Silva Leite, Fatima

Publication Date

2010

Abstract

We study rolling of one submanifold upon another submanifold, both isometrically embedded in a Riemannian manifold.We generalise the definition of rolling in Sharpe (1997). In this new definition, the Euclidean group of motions is replaced by the Lie group of orientation preserving isometries. We show that rolling in this general situation is unique. We prove a theorem that enables us to learn how to roll non-Euclidean manifolds that result from deformations of Euclidean submanifolds from the knowledge of the kinematic equations of rolling these Euclidean submanifolds. Taking into account that the ellipsoid is a deformed sphere, we apply the above mentioned theorem and the kinematic equations for the rolling sphere to derive the kinematic equations for rolling the ellipsoid. This example serves as a motivation to roll other manifolds.

Citation

Proceedings of the 9th Portuguese Conference on Automatic Control (CONTROLO'2010), p. 456-461

Link

https://hdl.handle.net/1959.11/8101

Publisher

Universidade de Coimbra, Faculdade de Ciências e Tecnologia

Title

Rolling Maps in Riemannian Manifolds

Type of document

Conference Publication

Entity Type

Publication

Author(s)	Krakowski, Krzysztof Silva Leite, Fatima
Publication Date	2010
Abstract	We study rolling of one submanifold upon another submanifold, both isometrically embedded in a Riemannian manifold.We generalise the definition of rolling in Sharpe (1997). In this new definition, the Euclidean group of motions is replaced by the Lie group of orientation preserving isometries. We show that rolling in this general situation is unique. We prove a theorem that enables us to learn how to roll non-Euclidean manifolds that result from deformations of Euclidean submanifolds from the knowledge of the kinematic equations of rolling these Euclidean submanifolds. Taking into account that the ellipsoid is a deformed sphere, we apply the above mentioned theorem and the kinematic equations for the rolling sphere to derive the kinematic equations for rolling the ellipsoid. This example serves as a motivation to roll other manifolds.
Citation	Proceedings of the 9th Portuguese Conference on Automatic Control (CONTROLO'2010), p. 456-461
Link	https://hdl.handle.net/1959.11/8101
Publisher	Universidade de Coimbra, Faculdade de Ciências e Tecnologia
Title	Rolling Maps in Riemannian Manifolds
Type of document	Conference Publication
Entity Type	Publication

Rolling Maps in Riemannian Manifolds

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