@phdthesis{oai:tsukuba.repo.nii.ac.jp:00008380,
 author = {伊藤, 光弘 and Itoh, Mitsuhiro},
 month = {},
 note = {Hermitian symmetric space play an important role in Kahler geometry. These spaces of compact type admit nonnegative sectional curvature (Helgason [6]). It is also known that an operator Q associated with the curvature tensor has at most two eigenvalues for each irreducible hermitian symmetric space of compact type (Calabi & Vesentini [5] and Borel [2]). An irreducible hermitian symmetric space of compact type is a typical example of Kahler C-spaces. By a C-space we mean a compact simply connected complex homogeneous space (Wang [13]) and by a Kahler C-space M which admits a Kahler metric such that a group of holomorphic isometries is transitive on M. The purpose of this paper is to discuss, for a Kahler C-space,  ･･･, 1979},
 school = {筑波大学, University of Tsukuba},
 title = {On curvature properties of Kaehler C-spaces},
 year = {1979}
}