AbstractWe characterize the symmetric space AI, i.e. SU(n)SO(n), and its noncompact dual by means of the Weingarten map on geodesic spheres and two particular tensor fields T and S of type (1,3) and (1,2) respectively, satisfying certain algebraic conditions
In [1] Blair, O.E.: 1970, J. Diff. Geom. 4, (155-167), S-manifolds, which reduce in a special case t...
AbstractLet M⊂Cn be a complex n-dimensional Hermitian symmetric space endowed with the hyperbolic fo...
summary:In the present paper a generalized Kählerian space $\mathbb {G} {\underset 1 {\mathbb {K}}_N...
AbstractWe characterize the symmetric space AI, i.e. SU(n)SO(n), and its noncompact dual by means of...
B. Y. Chen and T. Nagano [2] investigated the totally geodesic submanifolds in Riemannian symmetric ...
We characterize the symmetric space $M=Sp(n)/U(n)$ by using the shape operator of small geodesic sph...
AbstractLet X be a Riemannian symmetric space of noncompact type. Let V be a locally symmetric quoti...
Cartanian symmetrical property of Riemannian projective-symmetric spaces - tensor geometr
We consider complex projective space with its Fubini-Study metric and the X-ray transform defined by...
AbstractIn this paper, we present constructions of higher-order polynomialO(n)-invariants over curva...
Let (Sm, g) be a nuit shere in a Euclidean (m+1)-space. In a paper [4] the author gave an orthogonal...
In this paper we give a short geometric proof of a generalization of a well-known result about red...
summary:We prove that there is exactly one homothety class of invariant Einstein metrics in each spa...
AbstractFor every fixed Riemannian symmetric space (M̃,g̃) we determine explicitly all locally non-h...
First published in the Bulletin of the American Mathematical Society in Vol.69, 1963, published by t...
In [1] Blair, O.E.: 1970, J. Diff. Geom. 4, (155-167), S-manifolds, which reduce in a special case t...
AbstractLet M⊂Cn be a complex n-dimensional Hermitian symmetric space endowed with the hyperbolic fo...
summary:In the present paper a generalized Kählerian space $\mathbb {G} {\underset 1 {\mathbb {K}}_N...
AbstractWe characterize the symmetric space AI, i.e. SU(n)SO(n), and its noncompact dual by means of...
B. Y. Chen and T. Nagano [2] investigated the totally geodesic submanifolds in Riemannian symmetric ...
We characterize the symmetric space $M=Sp(n)/U(n)$ by using the shape operator of small geodesic sph...
AbstractLet X be a Riemannian symmetric space of noncompact type. Let V be a locally symmetric quoti...
Cartanian symmetrical property of Riemannian projective-symmetric spaces - tensor geometr
We consider complex projective space with its Fubini-Study metric and the X-ray transform defined by...
AbstractIn this paper, we present constructions of higher-order polynomialO(n)-invariants over curva...
Let (Sm, g) be a nuit shere in a Euclidean (m+1)-space. In a paper [4] the author gave an orthogonal...
In this paper we give a short geometric proof of a generalization of a well-known result about red...
summary:We prove that there is exactly one homothety class of invariant Einstein metrics in each spa...
AbstractFor every fixed Riemannian symmetric space (M̃,g̃) we determine explicitly all locally non-h...
First published in the Bulletin of the American Mathematical Society in Vol.69, 1963, published by t...
In [1] Blair, O.E.: 1970, J. Diff. Geom. 4, (155-167), S-manifolds, which reduce in a special case t...
AbstractLet M⊂Cn be a complex n-dimensional Hermitian symmetric space endowed with the hyperbolic fo...
summary:In the present paper a generalized Kählerian space $\mathbb {G} {\underset 1 {\mathbb {K}}_N...