Selected Papers of Kentaro YanoM. Obata Elsevier, 1 de gen. 1982 - 362 pàgines Selected Papers of Kentaro Yano |
Continguts
vii | |
ix | |
xi | |
xxxv | |
Chapter 1 Les espaces á connexion projective et la géométrie projective des paths | 395 |
Chapter 2 Sur la theorie des espaces á connexion conforme | 71 |
Chapter 3 On harmonic and Killing vector fields | 130 |
Chapter 4 On ndimensional Riemannian spaces admitting a group of motions of order nn12 + 1 | 138 |
Chapter 10 Harmonic and Killing vector fields in Compact oricntable Riemannian spaces with boundary | 230 |
Chapter 11 Projectively flat spaces with recurrent curvature | 241 |
Chapter 12 On a structure defined by a tensor field f of type 11 satisfying f 3 + f 0 | 251 |
Chapter 13 Prolongations of tensor fields and connections to tangent bundles I General theory | 262 |
Chapter 14 Some results related to the equivalence problem in Riemannian geometry | 279 |
Chapter 15 Vertical and complete lifts from a manifold to its cotangent bundle | 289 |
Chapter 16 Almost complex structures on tensor bundles | 313 |
Chapter 17 Differential geometric structures on principal toroidal bundles | 327 |
Chapter 5 On geometric objects and Lie groups of transformations | 159 |
Chapter 6 On invariant subspaces in an almost complex X2n | 169 |
Chapter 7 On real representations of Kaehlerian manifolds | 178 |
Chapter 8 A class of affinely connected spaces | 198 |
Chapter 9 Einstein spaces admitting a oneparameter group of conforma transformations | 219 |
Chapter 18 Kaehlerian manifolds with constant scalar curvature whose Bochner curvature tensor vanishes | 337 |
Chapter 19 Notes on infinitesimal variations of submanifolds | 345 |
Chapter 20 CR submanifolds of a complex space form | 355 |
Frases i termes més freqüents
Acad affine connection analytic complete lift complex structure components composantes connexion affine connexion conforme connexion projective constant curvature coordinate system courbe curvature tensor defined denote differential geometry dºu ds ds dsº duº dxº équations espaces à connexion f-structure formula function geodesic géodésique géométrie group G group of motions Hence holomorphic hypersurfaces infinitesimal variation integrable invariant Kaehlerian manifold KENTARO YANO Killing vector field Kôdai Math l'on Lemma Lie derivation linear M. E. CARTAN metric metric tensor n-dimensional naturel necessary and sufficient Nijenhuis tensor normal obtient ºº orthogonal paramètre peut Proc Professor projectif Proof Proposition rapport respect Ricci tensor Riemannian manifold Riemannian metric Riemannian space satisfying scalar Schouten sectional curvature sphère submanifolds symmetric tangent bundle tenseur tensor field Theorem théorie Tokyo variété à connexion vecteur vertical lift zero