Being a Lie group, the group SE(3) of orientation preserving motions of the real Euclidean 3-space becomes a symmetric space (in the sense of O. Loos) when endowed with the multiplication \mu(g, h) = gh^{-1}g. In this note we classify all connected symmetric subspaces of SE(3) up to conjugation. Moreover, we indicate some of its important applications in robot kinematics.
Symmetric subspaces of SE(3) / Löwe, Harald; Wu, Yuanqing; Carricato, Marco. - In: ADVANCES IN GEOMETRY. - ISSN 1615-715X. - STAMPA. - 16:3(2016), pp. 381-388. [10.1515/advgeom-2016-0015]
Symmetric subspaces of SE(3)
WU, YUANQING;CARRICATO, MARCO
2016
Abstract
Being a Lie group, the group SE(3) of orientation preserving motions of the real Euclidean 3-space becomes a symmetric space (in the sense of O. Loos) when endowed with the multiplication \mu(g, h) = gh^{-1}g. In this note we classify all connected symmetric subspaces of SE(3) up to conjugation. Moreover, we indicate some of its important applications in robot kinematics.File in questo prodotto:
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