In this paper we consider invariant square metrics which are induced by invariant Riemannian metrics and invariant vector fields on homogeneous spaces. We study geodesic vectors and investigates the set of all homogeneous geodesics on two-step nilpotent Lie groups of dimension five.
Habibi, P. (2021). Geodesic vectors of invariant square metrics on nilpotent Lie groups of dimension five. Journal of Finsler Geometry and its Applications, 2(1), 132-141. doi: 10.22098/jfga.2021.1270
MLA
Parastoo Habibi. "Geodesic vectors of invariant square metrics on nilpotent Lie groups of dimension five". Journal of Finsler Geometry and its Applications, 2, 1, 2021, 132-141. doi: 10.22098/jfga.2021.1270
HARVARD
Habibi, P. (2021). 'Geodesic vectors of invariant square metrics on nilpotent Lie groups of dimension five', Journal of Finsler Geometry and its Applications, 2(1), pp. 132-141. doi: 10.22098/jfga.2021.1270
VANCOUVER
Habibi, P. Geodesic vectors of invariant square metrics on nilpotent Lie groups of dimension five. Journal of Finsler Geometry and its Applications, 2021; 2(1): 132-141. doi: 10.22098/jfga.2021.1270