Add to ORKGWe introduce the construction of Klein links through an alteration to the orientation on the rectangular representation of a torus knot. We relate the resulting Klein links to their corresponding braid representations, and use these representations to understand the relationship between Klein links and torus knots as well as to prove relationships between several different Klein links
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
The objects of study in this thesis are knots. More precisely, positive braid knots, which include a...
AbstractRudolph introduced the notion of braidzel surfaces as a generalization of pretzel surfaces, ...
The (m,n)-Klein links are formed by altering the rectangular representation of an (m,n)-torus link. ...
We investigate characteristics of two classes of links in knot theory: torus links and Klein links. ...
Klein links are a nonorientable counterpart to torus knots and links. It is shown that braids repres...
We will examine the relationship between Klein links and Torus links, using both diagrammatic techni...
We have been trying to classify all Klein links by linking number and number of components. We use ...
Tied links in S^3 were introduced by Aicardi and Juyumaya as standard links in S^3 equipped with som...
Tied links in S^3 were introduced by Aicardi and Juyumaya as standard links in S^3 equipped with som...
Tied links in S^3 were introduced by Aicardi and Juyumaya as standard links in S^3 equipped with som...
This work provides the topological background and a preliminary study for the analogue of the 2-vari...
Torus-covering links and their triple linking numbers Inasa Nakamura (RIMS, Kyoto University) This r...
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
We consider surface links in the 4-space which can be deformed to simple branched coverings of a tri...
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
The objects of study in this thesis are knots. More precisely, positive braid knots, which include a...
AbstractRudolph introduced the notion of braidzel surfaces as a generalization of pretzel surfaces, ...
The (m,n)-Klein links are formed by altering the rectangular representation of an (m,n)-torus link. ...
We investigate characteristics of two classes of links in knot theory: torus links and Klein links. ...
Klein links are a nonorientable counterpart to torus knots and links. It is shown that braids repres...
We will examine the relationship between Klein links and Torus links, using both diagrammatic techni...
We have been trying to classify all Klein links by linking number and number of components. We use ...
Tied links in S^3 were introduced by Aicardi and Juyumaya as standard links in S^3 equipped with som...
Tied links in S^3 were introduced by Aicardi and Juyumaya as standard links in S^3 equipped with som...
Tied links in S^3 were introduced by Aicardi and Juyumaya as standard links in S^3 equipped with som...
This work provides the topological background and a preliminary study for the analogue of the 2-vari...
Torus-covering links and their triple linking numbers Inasa Nakamura (RIMS, Kyoto University) This r...
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
We consider surface links in the 4-space which can be deformed to simple branched coverings of a tri...
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
The objects of study in this thesis are knots. More precisely, positive braid knots, which include a...
AbstractRudolph introduced the notion of braidzel surfaces as a generalization of pretzel surfaces, ...