Add to ORKGAbstract. In this paper, we will introduce the isotwist foldings of a manifold M into itself. The limits of the isotwist foldings of a manifold are obtained. Also the relations be-tween conditional retraction and this type of the foldings are achieved. Finally the variant and invariant of the immersion under this type of foldings are deduced. 1
summary:In this note we give examples in every dimension $m \ge 9$ of piecewise linearly homeomorphi...
We study the space of immersions of S that are tangent to an Engel structure D. We show that the ful...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
An isometric folding from a Riemannian manifold M to another N is a map which sends piecewise geodes...
The folding of a manifold was, firstly introduced by Robertson in [1977] . Since then many authers h...
In this paper, the induced sequence of folding and unfolding on the fundamental group will be obtain...
CM{UTAD, Preprint number 28 centro de matematica cm{utad On deformations of spherical isometric fold...
In this article we study isometric immersions from Kähler manifolds into space forms which generali...
summary:The behavior of special classes of isometric foldings of the Riemannian sphere $S^2$ under t...
summary:The behavior of special classes of isometric foldings of the Riemannian sphere $S^2$ under t...
We will present our construction of a class of effectively calculable, isomorphism invariants for St...
We will present our construction of a class of effectively calculable, isomorphism invariants for St...
The Kervaire invariant is a Z=2-invariant of framed manifolds of dimension n = 4k + 2. W. Browder pr...
We study the space of immersions of S1 that are tangent to an Engel structure D. We show that the fu...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
summary:In this note we give examples in every dimension $m \ge 9$ of piecewise linearly homeomorphi...
We study the space of immersions of S that are tangent to an Engel structure D. We show that the ful...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
An isometric folding from a Riemannian manifold M to another N is a map which sends piecewise geodes...
The folding of a manifold was, firstly introduced by Robertson in [1977] . Since then many authers h...
In this paper, the induced sequence of folding and unfolding on the fundamental group will be obtain...
CM{UTAD, Preprint number 28 centro de matematica cm{utad On deformations of spherical isometric fold...
In this article we study isometric immersions from Kähler manifolds into space forms which generali...
summary:The behavior of special classes of isometric foldings of the Riemannian sphere $S^2$ under t...
summary:The behavior of special classes of isometric foldings of the Riemannian sphere $S^2$ under t...
We will present our construction of a class of effectively calculable, isomorphism invariants for St...
We will present our construction of a class of effectively calculable, isomorphism invariants for St...
The Kervaire invariant is a Z=2-invariant of framed manifolds of dimension n = 4k + 2. W. Browder pr...
We study the space of immersions of S1 that are tangent to an Engel structure D. We show that the fu...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...
summary:In this note we give examples in every dimension $m \ge 9$ of piecewise linearly homeomorphi...
We study the space of immersions of S that are tangent to an Engel structure D. We show that the ful...
summary:In the paper under review, the author presents some results on the basis of the Nash-Gromov ...