In the paper we utilize correspondence between the i-th homotopy group of (r+1)-sphere and the i-th homotopy group of the wedge sum of i (r+1)-spheres based on Hilton's theorem (the homotopy groups of such wedge sums consolidate all information about homotopy groups of spheres). This leads to a practical method for computing the homotopy groups of spheres. Moreover, it reduces the computation of the homotopy groups of (r+1)-sphere to a combinatorial group theory question
We discuss the current state of knowledge of stable homotopy groups of spheres. We describe a new co...
In the first part of the thesis we discuss the rank conjecture of Benson and Carlson. In particular,...
In the first part of the thesis we discuss the rank conjecture of Benson and Carlson. In particular,...
ABSTRACT. In this paper we will describe a point of view that has emerged as a result of research on...
We will give a combinatorial description of homotopy groups of K(; 1). In particular, all of the hom...
Abstract. The computation of the algebra of secondary cohomology opera-tions in [1] leads to a conje...
Let θn denote the group of h-cobordism classes of homotopy n-sphere under the connected sum oper...
1. Brief introduction to a lengthy subject Determining the stable homotopy groups of spheres has bee...
AbstractOne of the important theorems in homotopy theory is the Hilton Splitting Theorem which state...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
Abstract. We give a combinatorial description of general homotopy groups of k-dimensional spheres wi...
L’objectif de cette thèse est de démontrer que π4(S3) ≃ Z/2Z en théorie des types homotopiques. En p...
Abstract. We study the problems concerning on free actions of groups on a space which is homotopy eq...
"This work was supported by the United States Air Froce through the Air Force Office of Scientific R...
We discuss the current state of knowledge of stable homotopy groups of spheres. We describe a new co...
In the first part of the thesis we discuss the rank conjecture of Benson and Carlson. In particular,...
In the first part of the thesis we discuss the rank conjecture of Benson and Carlson. In particular,...
ABSTRACT. In this paper we will describe a point of view that has emerged as a result of research on...
We will give a combinatorial description of homotopy groups of K(; 1). In particular, all of the hom...
Abstract. The computation of the algebra of secondary cohomology opera-tions in [1] leads to a conje...
Let θn denote the group of h-cobordism classes of homotopy n-sphere under the connected sum oper...
1. Brief introduction to a lengthy subject Determining the stable homotopy groups of spheres has bee...
AbstractOne of the important theorems in homotopy theory is the Hilton Splitting Theorem which state...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
In this paper we attempt to survey some of the ideas Mark Mahowald has contributed to the study of t...
Abstract. We give a combinatorial description of general homotopy groups of k-dimensional spheres wi...
L’objectif de cette thèse est de démontrer que π4(S3) ≃ Z/2Z en théorie des types homotopiques. En p...
Abstract. We study the problems concerning on free actions of groups on a space which is homotopy eq...
"This work was supported by the United States Air Froce through the Air Force Office of Scientific R...
We discuss the current state of knowledge of stable homotopy groups of spheres. We describe a new co...
In the first part of the thesis we discuss the rank conjecture of Benson and Carlson. In particular,...
In the first part of the thesis we discuss the rank conjecture of Benson and Carlson. In particular,...
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