Add to ORKGWe formulate three slightly different notions of oriented singular homology and show that all three are homotopic to ordinary singular homology.
summary:Homology functor in the spirit of the AST is defined, its basic properties are studied. Eile...
AbstractIn the present paper, we prove that for an n-dimensional compact orbifold with an s-homologi...
Algebra has been used to define and answer issues in almost every field of mathematics, science, and...
Singular homology is a beautiful theory, in which we can see a clear correspondence between Algebra ...
A major part of topology is the study of properties of topological spaces that are invariant under h...
In this paper we introduce the singular homology theory. First, we develop its main characteristics ...
The paper investigates a homology theory based on the ideas of Milnor and Thurston that by consideri...
This paper deals with the different contributions from Homology theory. It defines homology in homot...
Abstract. Measure homology is a variation of singular homology designed by Thurston in his discussio...
Grigoryan A, Muranov Y. On homology theories of cubical digraphs. Pacific Journal of Mathematics. 20...
> Z p (K), and we define the homology group H p (K) as the quotient group H p (K) = Z p (K)=B p ...
This thesis studies the geometric properties related to certain transversality statements on singula...
summary:In this paper we extend the Eilenberg-Steenrod axiomatic description of a homology theory fr...
We give analogue of singular homology for local-product topological space. We suggest that it can b...
AbstractFor an orbifold M we define a new homology group, called t-singular homology group t-Hq(M) b...
summary:Homology functor in the spirit of the AST is defined, its basic properties are studied. Eile...
AbstractIn the present paper, we prove that for an n-dimensional compact orbifold with an s-homologi...
Algebra has been used to define and answer issues in almost every field of mathematics, science, and...
Singular homology is a beautiful theory, in which we can see a clear correspondence between Algebra ...
A major part of topology is the study of properties of topological spaces that are invariant under h...
In this paper we introduce the singular homology theory. First, we develop its main characteristics ...
The paper investigates a homology theory based on the ideas of Milnor and Thurston that by consideri...
This paper deals with the different contributions from Homology theory. It defines homology in homot...
Abstract. Measure homology is a variation of singular homology designed by Thurston in his discussio...
Grigoryan A, Muranov Y. On homology theories of cubical digraphs. Pacific Journal of Mathematics. 20...
> Z p (K), and we define the homology group H p (K) as the quotient group H p (K) = Z p (K)=B p ...
This thesis studies the geometric properties related to certain transversality statements on singula...
summary:In this paper we extend the Eilenberg-Steenrod axiomatic description of a homology theory fr...
We give analogue of singular homology for local-product topological space. We suggest that it can b...
AbstractFor an orbifold M we define a new homology group, called t-singular homology group t-Hq(M) b...
summary:Homology functor in the spirit of the AST is defined, its basic properties are studied. Eile...
AbstractIn the present paper, we prove that for an n-dimensional compact orbifold with an s-homologi...
Algebra has been used to define and answer issues in almost every field of mathematics, science, and...