AbstractWe give a classification of n-component links up to Cn-move. In order to prove this classification, we characterize Brunnian links, and have that a Brunnian link is ambient isotopic to a band sum of a trivial link and Milnor's links
Abstract. After describing classical Borromean links and their properties, Borromean property and Br...
Link homotopy has been an active area of research for knot theorists since its introduction by Milno...
Abstract. A pass-move and a #-move are local moves on oriented links defined by L. H. Kau¤man and H....
We give a classification of n-component links up to Cn-move. In order to prove this classification, ...
AbstractWe give a classification of n-component links up to Cn-move. In order to prove this classifi...
AbstractIn this note, we will study Δ link homotopy (or self Δ-equivalence), which is an equivalence...
AbstractIn this paper we generalize Milnor's μ-invariants (which were originally defined for “almost...
AbstractLink-homotopy and self Δ-equivalence are equivalence relations on links. It was shown by J. ...
AbstractA clasp-pass move is a local move on oriented links introduced by Habiro in 1993. He showed ...
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
Abstract. In this paper we generalize Milnor’s µ-invariants of classical links to certain (“κ-Brunni...
Abstract. We provide an alternative proof that Koschorke’s κ-invariant is injective on the set of li...
International audienceWe consider knotted annuli in 4–space, called 2–string-links, which are knotte...
We use an action, of 2l-component string links on l-component string links, defined by the first aut...
We introduce a framework to analyze knots and links in an unmarked solid torus. We discuss invariant...
Abstract. After describing classical Borromean links and their properties, Borromean property and Br...
Link homotopy has been an active area of research for knot theorists since its introduction by Milno...
Abstract. A pass-move and a #-move are local moves on oriented links defined by L. H. Kau¤man and H....
We give a classification of n-component links up to Cn-move. In order to prove this classification, ...
AbstractWe give a classification of n-component links up to Cn-move. In order to prove this classifi...
AbstractIn this note, we will study Δ link homotopy (or self Δ-equivalence), which is an equivalence...
AbstractIn this paper we generalize Milnor's μ-invariants (which were originally defined for “almost...
AbstractLink-homotopy and self Δ-equivalence are equivalence relations on links. It was shown by J. ...
AbstractA clasp-pass move is a local move on oriented links introduced by Habiro in 1993. He showed ...
An oriented n-component link is a smooth embedding of n oriented copies of S1 into S3. A diagram of ...
Abstract. In this paper we generalize Milnor’s µ-invariants of classical links to certain (“κ-Brunni...
Abstract. We provide an alternative proof that Koschorke’s κ-invariant is injective on the set of li...
International audienceWe consider knotted annuli in 4–space, called 2–string-links, which are knotte...
We use an action, of 2l-component string links on l-component string links, defined by the first aut...
We introduce a framework to analyze knots and links in an unmarked solid torus. We discuss invariant...
Abstract. After describing classical Borromean links and their properties, Borromean property and Br...
Link homotopy has been an active area of research for knot theorists since its introduction by Milno...
Abstract. A pass-move and a #-move are local moves on oriented links defined by L. H. Kau¤man and H....
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