A few weight systems arising from intersection graphs
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Publication:1432726
DOI10.1307/mmj/1070919557zbMath1058.57008arXivmath/0004080OpenAlexW2071389504MaRDI QIDQ1432726
Publication date: 15 June 2004
Published in: Michigan Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0004080
Kauffman polynomialVassiliev invariantfinite type invariantHOMFLYPT polynomialchord diagramConway polynomial
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Related Items (11)
A BRACKET POLYNOMIAL FOR GRAPHS, IV: UNDIRECTED EULER CIRCUITS, GRAPH-LINKS AND MULTIPLY MARKED GRAPHS ⋮ Parity in knot theory and graph-links ⋮ On the linear algebra of local complementation ⋮ A BRACKET POLYNOMIAL FOR GRAPHS, III: VERTEX WEIGHTS ⋮ The transition matroid of a 4-regular graph: an introduction ⋮ A BRACKET POLYNOMIAL FOR GRAPHS, II: LINKS, EULER CIRCUITS AND MARKED GRAPHS ⋮ \(J\)-invariants of plane curves and framed chord diagrams ⋮ Binary nullity, Euler circuits and interlace polynomials ⋮ On a weight system conjecturally related to \(\mathfrak{s}l_2\) ⋮ INTERSECTION GRAPHS FOR STRING LINKS ⋮ TREE DIAGRAMS FOR STRING LINKS
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- On the Melvin-Morton-Rozansky conjecture
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- The Rank of the Trip Matrix of a Positive Knot Diagram
- VASSILIEV KNOT INVARIANTS COMING FROM LIE ALGEBRAS AND 4-INVARIANTS
- THE INTERSECTION GRAPH CONJECTURE FOR LOOP DIAGRAMS
- DISTINGUISHING MUTANTS BY KNOT POLYNOMIALS
- The Kontsevich integral
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