Add to ORKGWe prove that every germ of a smooth fibration of an odd-dimensional round sphere by great circles extends to such a fibration of the entire sphere, a result previously known only in dimension three
Bounded symmetric domains are the Harish-Chandra realizations of Hermitian symmetric manifolds of th...
In this paper, we consider a special class of the surfaces in 3-sphere dened by one-parameter famili...
In 1954 Segre proved the following celebrated theorem : In PG(2, q), with q odd, every oval is a non...
The Hopf fibrations of S2n+1 by great circles, S4n+3 by great 3-spheres, and S15 by great 7-spheres ...
On smooth extensions of odd dimensional spheres and multidimensional Helton and Howe formul
Fibrations of s2n-1 by great (n-1)-spheres arise in the theory of Blaschke manifolds; see Gluck-Warn...
Abstract. We construct an explicit diffeomorphism taking any fibration of a sphere by great circles ...
We give an upper bound for the dimension of a germ of a totally geodesic submanifold, and hence of a...
Abstract. We present a (possibly) new sphere eversion based on the con-tractibility * of a certain s...
The Hopf fibrations of S2n+1 by great circles, S4n+3 by great 3-spheres, and S15 by great 7-spheres ...
We construct all $\cal A$e-codimension 1 multi-germs of analytic (or smooth) maps (kn, T) [rightward...
We construct all A(e)-codimension 1 multi-germs of analytic (or smooth) maps (k(n), T) --> (k(p), 0)...
We give homological conditions which determine sectional cate-gory, secat, for rational spherical br...
The well-known Hopf fibration of S3 is interesting in part because its fibers are geodesics, or grea...
Let f : U subset of R(2) -> R(3) be a representative of a finitely determined map germ f : (R(2), 0)...
Bounded symmetric domains are the Harish-Chandra realizations of Hermitian symmetric manifolds of th...
In this paper, we consider a special class of the surfaces in 3-sphere dened by one-parameter famili...
In 1954 Segre proved the following celebrated theorem : In PG(2, q), with q odd, every oval is a non...
The Hopf fibrations of S2n+1 by great circles, S4n+3 by great 3-spheres, and S15 by great 7-spheres ...
On smooth extensions of odd dimensional spheres and multidimensional Helton and Howe formul
Fibrations of s2n-1 by great (n-1)-spheres arise in the theory of Blaschke manifolds; see Gluck-Warn...
Abstract. We construct an explicit diffeomorphism taking any fibration of a sphere by great circles ...
We give an upper bound for the dimension of a germ of a totally geodesic submanifold, and hence of a...
Abstract. We present a (possibly) new sphere eversion based on the con-tractibility * of a certain s...
The Hopf fibrations of S2n+1 by great circles, S4n+3 by great 3-spheres, and S15 by great 7-spheres ...
We construct all $\cal A$e-codimension 1 multi-germs of analytic (or smooth) maps (kn, T) [rightward...
We construct all A(e)-codimension 1 multi-germs of analytic (or smooth) maps (k(n), T) --> (k(p), 0)...
We give homological conditions which determine sectional cate-gory, secat, for rational spherical br...
The well-known Hopf fibration of S3 is interesting in part because its fibers are geodesics, or grea...
Let f : U subset of R(2) -> R(3) be a representative of a finitely determined map germ f : (R(2), 0)...
Bounded symmetric domains are the Harish-Chandra realizations of Hermitian symmetric manifolds of th...
In this paper, we consider a special class of the surfaces in 3-sphere dened by one-parameter famili...
In 1954 Segre proved the following celebrated theorem : In PG(2, q), with q odd, every oval is a non...