Add to ORKGAbstract Milnor’s triple linking numbers of a link in the 3-sphere are interpreted geometrically in terms of the pattern of intersections of the Seifert surfaces of the components of the link. This generalizes the well known formula as an algebraic count of triple points when the pairwise linking numbers vanish. AMS Classication 57M25; 57M2
Abstract. A triple crossing is a crossing in a projection of a knot or link that has three strands o...
We construct a link homotopy invariant for three-component spherical link maps which is a generalisa...
Any topological theory of knots and links should be based on simple ideas of intersection and linkin...
Abstract Milnor’s triple linking numbers of a link in the 3-sphere are interpreted geometrically in ...
Milnor\u27s triple linking numbers of a link in the 3-sphere are interpreted geometrically in terms ...
AbstractThe triple linking number of an oriented surface link was defined as an analogical notion of...
Color poster with text, images, and formulas.In the 1950’s Milnor defined a new family of tools of l...
We give a simple axiomatic definition of a rational-valued invariant σ(W, V, e) of triples (W, V, e)...
We establish some new relationships between Milnor invariants and Heegaard Floer homology. This incl...
Torus-covering links and their triple linking numbers Inasa Nakamura (RIMS, Kyoto University) This r...
We give a simple axiomatic definition of a rational-valued invariant σ(W, V, e) of triples (W, V, e)...
We characterise when two links in the 3–sphere admit homeomorphic surface systems, where a surface s...
Analogous to a classical knot diagram, a surface-link can be generically projected to 3-space and gi...
AbstractA generic projection of a surface-link onto 3-space may contain some triple points. We study...
In this paper, we introduce two functions such that the subtraction corresponds to the Milnor's trip...
Abstract. A triple crossing is a crossing in a projection of a knot or link that has three strands o...
We construct a link homotopy invariant for three-component spherical link maps which is a generalisa...
Any topological theory of knots and links should be based on simple ideas of intersection and linkin...
Abstract Milnor’s triple linking numbers of a link in the 3-sphere are interpreted geometrically in ...
Milnor\u27s triple linking numbers of a link in the 3-sphere are interpreted geometrically in terms ...
AbstractThe triple linking number of an oriented surface link was defined as an analogical notion of...
Color poster with text, images, and formulas.In the 1950’s Milnor defined a new family of tools of l...
We give a simple axiomatic definition of a rational-valued invariant σ(W, V, e) of triples (W, V, e)...
We establish some new relationships between Milnor invariants and Heegaard Floer homology. This incl...
Torus-covering links and their triple linking numbers Inasa Nakamura (RIMS, Kyoto University) This r...
We give a simple axiomatic definition of a rational-valued invariant σ(W, V, e) of triples (W, V, e)...
We characterise when two links in the 3–sphere admit homeomorphic surface systems, where a surface s...
Analogous to a classical knot diagram, a surface-link can be generically projected to 3-space and gi...
AbstractA generic projection of a surface-link onto 3-space may contain some triple points. We study...
In this paper, we introduce two functions such that the subtraction corresponds to the Milnor's trip...
Abstract. A triple crossing is a crossing in a projection of a knot or link that has three strands o...
We construct a link homotopy invariant for three-component spherical link maps which is a generalisa...
Any topological theory of knots and links should be based on simple ideas of intersection and linkin...