000 02272pam a2200385 a 4500
001 1181647
003 RPAM
005 20160624102321.0
006 m b 000 0
007 cr/|||||||||||
008 140928s1997 riu ob 000 0 eng
020 _a9781470402082 (online)
040 _aDLC
_cDLC
_dDLC
_dRPAM
050 0 0 _aQA3
_b.A57 no. 619
_aQA614.82
082 0 0 _a510 s
_a516.3/73
_221
100 1 _aKiyohara, Kazuyoshi,
_d1954-
245 1 0 _aTwo classes of Riemannian manifolds whose geodesic flows are integrable /
_h[electronic resource]
_cKazuyoshi Kiyohara.
260 _aProvidence, R.I. :
_bAmerican Mathematical Society,
_cc1997.
300 _a1 online resource (vii, 143 p.)
490 0 _aMemoirs of the American Mathematical Society,
_x0065-9266 (print);
_x1947-6221 (online);
_vv. 619
500 _a"November 1997, volume 130, number 619 (third of 4 numbers)."
504 _aIncludes bibliographical references (p. 142-143).
505 0 0 _tPart 1. Liouville manifolds
_tIntroduction
_t1. Local structure of proper Liouville manifolds
_t2. Global structure of proper Liouville manifolds
_t3. Proper Liouville manifolds of rank one
_tAppendix. Simply connected manifolds of constant curvature
_tPart 2. K�ahler-Liouville manifolds
_tIntroduction
_t1. Local calculus on $M^1$
_t2. Summing up the local data
_t3. Structure of $M-M^1$
_t4. Torus action and the invariant hypersurfaces
_t5. Properties as a toric variety
_t6. Bundle structure associated with a subset of $\mathcal {A}$
_t7. The case where $\#\mathcal {A}=1$
_t8. Existence theorem
506 1 _aAccess is restricted to licensed institutions
533 _aElectronic reproduction.
_bProvidence, Rhode Island :
_cAmerican Mathematical Society.
_d2012
538 _aMode of access : World Wide Web
588 _aDescription based on print version record.
650 0 _aGeodesic flows.
650 0 _aRiemannian manifolds.
776 0 _iPrint version:
_aKiyohara, Kazuyoshi, 1954-
_tTwo classes of Riemannian manifolds whose geodesic flows are integrable /
_w(DLC) 97030685
_x0065-9266
_z9780821806401
786 _dAmerican mathematical Society
856 4 _3Contents
_uhttp://www.ams.org/memo/0619
856 4 _3Contents
_uhttp://dx.doi.org/10.1090/memo/0619
942 _2EBK13072
_cEBK
999 _c42366
_d42366