AbstractIn this paper we give two new combinatorial proofs of the classification of rational tangles using the calculus of continued fractions. One proof uses the classification of alternating knots. The other proof uses colorings of tangles. We also obtain an elementary proof that alternating rational tangles have minimal number of crossings. Rational tangles form a basis for the classification of knots and are of fundamental importance in the study of DNA recombination
Nesta dissertação ao apresentamos um procedimento para a determinação rigorosa das estruturas topolo...
Abstract. We use categorical skew Howe duality to find recursion rules that compute categorified sl(...
Topology is a branch of mathematics which may be loosely described as the study of flexible spaces...
AbstractIn this paper we give two new combinatorial proofs of the classification of rational tangles...
AbstractThis paper gives an elementary and self-contained proof of Conway's Basic Theorem on rationa...
This paper gives an elementary and self-contained proof of Conway’s Basic Theorem on rational tangle...
Color poster with text and formulas.Knot theory is a field of topology that studies the embedding of...
A major goal in the study of knot theory is to discover more practical and universal methods that d...
The aim of this thesis is to describe the Khovanov homology of rational tangles. To this extent we d...
We define the regular Euclidean algorithm and the general form which leads to the method of least ab...
[EN] In this paper we present the construction of a group Hopf algebra on the class of rational tang...
Color poster with text, charts, and formulas.The purpose of this study was to determine a subset fro...
In this paper we present the construction of a group Hopf algebra on the class of rational tangles. ...
We define the regular Euclidean algorithm and the general form which leads to the method of least ab...
Abstract. We extend the tangle model, originally developed by Ernst and Sumners [18], to include com...
Nesta dissertação ao apresentamos um procedimento para a determinação rigorosa das estruturas topolo...
Abstract. We use categorical skew Howe duality to find recursion rules that compute categorified sl(...
Topology is a branch of mathematics which may be loosely described as the study of flexible spaces...
AbstractIn this paper we give two new combinatorial proofs of the classification of rational tangles...
AbstractThis paper gives an elementary and self-contained proof of Conway's Basic Theorem on rationa...
This paper gives an elementary and self-contained proof of Conway’s Basic Theorem on rational tangle...
Color poster with text and formulas.Knot theory is a field of topology that studies the embedding of...
A major goal in the study of knot theory is to discover more practical and universal methods that d...
The aim of this thesis is to describe the Khovanov homology of rational tangles. To this extent we d...
We define the regular Euclidean algorithm and the general form which leads to the method of least ab...
[EN] In this paper we present the construction of a group Hopf algebra on the class of rational tang...
Color poster with text, charts, and formulas.The purpose of this study was to determine a subset fro...
In this paper we present the construction of a group Hopf algebra on the class of rational tangles. ...
We define the regular Euclidean algorithm and the general form which leads to the method of least ab...
Abstract. We extend the tangle model, originally developed by Ernst and Sumners [18], to include com...
Nesta dissertação ao apresentamos um procedimento para a determinação rigorosa das estruturas topolo...
Abstract. We use categorical skew Howe duality to find recursion rules that compute categorified sl(...
Topology is a branch of mathematics which may be loosely described as the study of flexible spaces...
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