TY  - BOOK
AU  - Kiyohara,Kazuyoshi
TI  - Two classes of Riemannian manifolds whose geodesic flows are integrable
T2  - Memoirs of the American Mathematical Society, 
SN  - 9781470402082 (online)
AV  - QA3QA614.82 .A57 no. 619
U1  - 510 s516.3/73 21
PY  - 1997///
CY  - Providence, R.I.
PB  - American Mathematical Society
KW  - Geodesic flows
KW  - Riemannian manifolds
N1  - "November 1997, volume 130, number 619 (third of 4 numbers)."; Includes bibliographical references (p. 142-143); Part 1. Liouville manifolds; Introduction; 1. Local structure of proper Liouville manifolds; 2. Global structure of proper Liouville manifolds; 3. Proper Liouville manifolds of rank one; Appendix. Simply connected manifolds of constant curvature; Part 2. K�ahler-Liouville manifolds; Introduction; 1. Local calculus on $M^1$; 2. Summing up the local data; 3. Structure of $M-M^1$; 4. Torus action and the invariant hypersurfaces; 5. Properties as a toric variety; 6. Bundle structure associated with a subset of $\mathcal {A}$; 7. The case where $\#\mathcal {A}=1$; 8. Existence theorem; Access is restricted to licensed institutions; Electronic reproduction; Providence, Rhode Island; American Mathematical Society; 2012
UR  - http://www.ams.org/memo/0619
UR  - http://dx.doi.org/10.1090/memo/0619
ER  -