The folding of a manifold was, firstly introduced by Robertson in [1977] . Since then many authers have studied the folding of manifolds s. The deformation retracts of the manifolds defined and discussed. In this paper, we will discuss the folding restricted by a minimal retract and geodesic
An isometric folding from a Riemannian manifold M to another N is a map which sends piecewise geodes...
Must space be a unity? This question, which exercised Aristotle, Descartes and Kant, is a speci"...
Retractions between hyperspaces have been studied by many authors. We study retractions form m-fold ...
Abstract: A Smarandache multi-spacetime is such a union spacetime n⋃ i=1 Si of spacetimes S1, S2, ·...
The deformation retract of the Kerr spacetime is introduced using Lagrangian equations. The equatori...
Abstract: Our aim in the present study is to introduce and study new types of retractions of hyperhe...
Abstract. In this paper, we will introduce the isotwist foldings of a manifold M into itself. The li...
Folding is not only a design operation of shaping but also a philosophy theory from Deleuze (Deleuze...
We study the intrinsic geometry of area minimizing hypersurfaces from a new point of view by relatin...
In this paper, the induced sequence of folding and unfolding on the fundamental group will be obtain...
AbstractIn this article, we introduce types of foldings in chaotic special types of space time. The ...
We discuss general aspects of dimensional reduction induced by nonlinear scalar dynamics, including ...
Retractions are a prevalent tool in Riemannian optimization that provides a way to smoothly select a...
We discuss general aspects of dimensional reduction induced by nonlinear scalar dynamics, including ...
In [7], Gromov introduced a notion, Hausdorff distance, between two metric spaces. Several authors f...
An isometric folding from a Riemannian manifold M to another N is a map which sends piecewise geodes...
Must space be a unity? This question, which exercised Aristotle, Descartes and Kant, is a speci"...
Retractions between hyperspaces have been studied by many authors. We study retractions form m-fold ...
Abstract: A Smarandache multi-spacetime is such a union spacetime n⋃ i=1 Si of spacetimes S1, S2, ·...
The deformation retract of the Kerr spacetime is introduced using Lagrangian equations. The equatori...
Abstract: Our aim in the present study is to introduce and study new types of retractions of hyperhe...
Abstract. In this paper, we will introduce the isotwist foldings of a manifold M into itself. The li...
Folding is not only a design operation of shaping but also a philosophy theory from Deleuze (Deleuze...
We study the intrinsic geometry of area minimizing hypersurfaces from a new point of view by relatin...
In this paper, the induced sequence of folding and unfolding on the fundamental group will be obtain...
AbstractIn this article, we introduce types of foldings in chaotic special types of space time. The ...
We discuss general aspects of dimensional reduction induced by nonlinear scalar dynamics, including ...
Retractions are a prevalent tool in Riemannian optimization that provides a way to smoothly select a...
We discuss general aspects of dimensional reduction induced by nonlinear scalar dynamics, including ...
In [7], Gromov introduced a notion, Hausdorff distance, between two metric spaces. Several authors f...
An isometric folding from a Riemannian manifold M to another N is a map which sends piecewise geodes...
Must space be a unity? This question, which exercised Aristotle, Descartes and Kant, is a speci"...
Retractions between hyperspaces have been studied by many authors. We study retractions form m-fold ...
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