TY - JOUR
T1 - The Riemannian geometry of orbit spaces - The metric, geodesics, and integrable systems
AU - Alekseevsky, Dmitri V.
AU - Kriegl, Andreas
AU - Losik, Mark
AU - Michor, Peter
N1 - Affiliations: Department of Mathematics, University of Hull, Cottingham Road, Hull HU6 7RX, United Kingdom; Institut für Mathematik, Universität Wien, Strudlhofgasse 4, A-1090 Wien, Austria; Saratov State University, Ul. Astrakhanskaya 83, 410026 Saratov, Russian Federation; Erwin Schrodinger Inst. Math. Phys., Boltzmanngasse 9, A-1090 Wien, Austria
Adressen: Alekseevsky, D.; Department of Mathematics; University of Hull; Cottingham Road Hull HU6 7RX, United Kingdom; email: [email protected]
Source-File: 506Scopus.csv
Import aus Scopus: 2-s2.0-0038585093
Importdatum: 24.01.2007 11:25:44
22.10.2007: Datenanforderung 1920 (Import Sachbearbeiter)
04.01.2008: Datenanforderung 2054 (Import Sachbearbeiter)
PY - 2003
Y1 - 2003
N2 - We investigate the rudiments of Riemannian geometry on orbit spaces M/G for isometric proper actions of Lie groups on Riemannian manifolds. Minimal geodesic arcs are length minimising curves in the metric space M/G and they can hit strata which are more singular only at the end points. This is phrased as convexity result. The geodesic spray, viewed as a (strata-preserving) vector field on TM/G, leads to the notion of geodesics in M/G which are projections under M ? M/G of geodesics which are normal to the orbits. It also leads to 'ballistic curves' which are projections of the other geodesics. In examples (Hermitian and symmetric matrices, and more generally polar representations) we compute their equations by singular symplectic reductions and obtain generalizations of Calogero-Moser systems with spin.
AB - We investigate the rudiments of Riemannian geometry on orbit spaces M/G for isometric proper actions of Lie groups on Riemannian manifolds. Minimal geodesic arcs are length minimising curves in the metric space M/G and they can hit strata which are more singular only at the end points. This is phrased as convexity result. The geodesic spray, viewed as a (strata-preserving) vector field on TM/G, leads to the notion of geodesics in M/G which are projections under M ? M/G of geodesics which are normal to the orbits. It also leads to 'ballistic curves' which are projections of the other geodesics. In examples (Hermitian and symmetric matrices, and more generally polar representations) we compute their equations by singular symplectic reductions and obtain generalizations of Calogero-Moser systems with spin.
M3 - Article
SN - 0033-3883
VL - 62
SP - 247
EP - 276
JO - Publicationes Mathematicae
JF - Publicationes Mathematicae
IS - 3-4
ER -