Add to ORKGBy combining the algebraic topological concepts such as Euler characteristics, (co)homology groups, fundamental and homotopy groups with digital topology we can compare, classify or identify the digital images between each other. In this paper, we explore the digital relative homotopy relation between two continuous functions on a pointed digital image whose domains are n-cube and which map the boundary of an n-cube to a fix point. Then we introduce the nth homotopy group of a pointed digital image and give a relation between the homotopy groups of two pointed digital images
The main contribution of this paper is a new “extrinsic” digital fundamental group that can be read...
AbstractThe main contribution of this paper is a new “extrinsic” digital fundamental group that can ...
In this paper, we study certain properties of digital H-spaces. We prove that a digital image that h...
By combining the algebraic topological concepts such as Euler characteristics, (co)homology groups, ...
In this paper we are interested in relative homology groups of digital images. Some properties of th...
WOS: 000338123400029In this paper we are interested in relative homology groups of digital images. S...
Some properties of the Euler characteristics for digital images are given. We also present reduced h...
In this paper we are interested in relative homology groups of digital images. Some properties of th...
In this paper we are interested in relative homology groups of digital images. Some properties of th...
In this paper, we study out a method for computing digital homotopy groups in higher dimensions. We ...
In this paper we prove results relating to two homotopy relations and four homology theories develop...
WOS: 000338123400037In this paper, we study out a method for computing digital homotopy groups in hi...
AbstractThe main contribution of this paper is a new “extrinsic” digital fundamental group that can ...
We introduce three generalizations of homotopy equivalence in digital images, to allow us to express...
AbstractIn an earlier paper written for a different readership [Computers and Graphics 13(2) (1989) ...
The main contribution of this paper is a new “extrinsic” digital fundamental group that can be read...
AbstractThe main contribution of this paper is a new “extrinsic” digital fundamental group that can ...
In this paper, we study certain properties of digital H-spaces. We prove that a digital image that h...
By combining the algebraic topological concepts such as Euler characteristics, (co)homology groups, ...
In this paper we are interested in relative homology groups of digital images. Some properties of th...
WOS: 000338123400029In this paper we are interested in relative homology groups of digital images. S...
Some properties of the Euler characteristics for digital images are given. We also present reduced h...
In this paper we are interested in relative homology groups of digital images. Some properties of th...
In this paper we are interested in relative homology groups of digital images. Some properties of th...
In this paper, we study out a method for computing digital homotopy groups in higher dimensions. We ...
In this paper we prove results relating to two homotopy relations and four homology theories develop...
WOS: 000338123400037In this paper, we study out a method for computing digital homotopy groups in hi...
AbstractThe main contribution of this paper is a new “extrinsic” digital fundamental group that can ...
We introduce three generalizations of homotopy equivalence in digital images, to allow us to express...
AbstractIn an earlier paper written for a different readership [Computers and Graphics 13(2) (1989) ...
The main contribution of this paper is a new “extrinsic” digital fundamental group that can be read...
AbstractThe main contribution of this paper is a new “extrinsic” digital fundamental group that can ...
In this paper, we study certain properties of digital H-spaces. We prove that a digital image that h...