A BRACKET POLYNOMIAL FOR GRAPHS, I
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Publication:5851749
DOI10.1142/S021821650900766XzbMath1204.57009arXiv0808.3392OpenAlexW2963108556MaRDI QIDQ5851749
Publication date: 25 January 2010
Published in: Journal of Knot Theory and Its Ramifications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0808.3392
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Related Items (11)
On the combinatorics of smoothing ⋮ Graph-links: nonrealizability, orientation, and Jones polynomial ⋮ A BRACKET POLYNOMIAL FOR GRAPHS, IV: UNDIRECTED EULER CIRCUITS, GRAPH-LINKS AND MULTIPLY MARKED GRAPHS ⋮ Topological realizations of ortho-projection graphs ⋮ Interlace polynomials for multimatroids and delta-matroids ⋮ Parity in knot theory and graph-links ⋮ A BRACKET POLYNOMIAL FOR GRAPHS, III: VERTEX WEIGHTS ⋮ A BRACKET POLYNOMIAL FOR GRAPHS, II: LINKS, EULER CIRCUITS AND MARKED GRAPHS ⋮ Orienting transversals and transition polynomials of multimatroids ⋮ Binary nullity, Euler circuits and interlace polynomials ⋮ AN EQUIVALENCE BETWEEN THE SET OF GRAPH-KNOTS AND THE SET OF HOMOTOPY CLASSES OF LOOPED GRAPHS
Cites Work
- A two-variable interlace polynomial
- The interlace polynomial of a graph
- Sur l'invariant de Kervaire des noeuds classiques
- A spanning tree expansion of the Jones polynomial
- State models and the Jones polynomial
- Circle graph obstructions
- Virtual knot theory
- Alternating knot diagrams, Euler circuits and the interlace polynomial
- A matrix for computing the Jones polynomial of a knot
- Mutant knots and intersection graphs
- AN EXTENSION OF THE JONES POLYNOMIAL OF CLASSICAL KNOTS
- A polynomial invariant for knots via von Neumann algebras
- INVARIANTS OF KNOT DIAGRAMS AND RELATIONS AMONG REIDEMEISTER MOVES
- On the computational complexity of the Jones and Tutte polynomials
- ON TANGLES AND MATROIDS
- Multimatroids. III: Tightness and fundamental graphs
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