The Gordon–Litherland pairing for links in thickened surfaces
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Publication:5057902
DOI10.1142/S0129167X22500781WikidataQ114073215 ScholiaQ114073215MaRDI QIDQ5057902
M. W. Chrisman, Homayun Karimi, Hans U. Boden
Publication date: 1 December 2022
Published in: International Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2107.00426
signatureknotintersection formlinknullitySeifert surfacevirtual linkGoeritz matrixspanning surfaceTait graphvirtual knotKirby diagramcheckerboard coloringGordon-Litherland pairing
Related Items
A characterization of alternating links in thickened surfaces, The Jones polynomial from a Goeritz matrix
Cites Work
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- Branched covers of surfaces in 4-manifolds
- On the signature of a link
- What is a virtual link?
- The Khovanov homology of alternating virtual links
- Milnor's concordance invariants for knots on surfaces
- Alternating links and definite surfaces
- A generalization of several classical invariants of links
- The Jones-Krushkal polynomial and minimal diagrams of surface links
- PARITY AND PROJECTION FROM VIRTUAL KNOTS TO CLASSICAL KNOTS
- Virtual knot groups and almost classical knots
- Numerical invariants of links in 3-manifolds
- STABLE EQUIVALENCE OF KNOTS ON SURFACES AND VIRTUAL KNOT COBORDISMS
- SIGNATURE, NULLITY AND DETERMINANT OF CHECKERBOARD COLORABLE VIRTUAL LINKS
- Signature and concordance of virtual knots
- Virtual Seifert surfaces
- AN ELEMENTARY PROOF FOR THAT ALL UNORIENTED SPANNING SURFACES OF A LINK ARE RELATED BY ATTACHING/DELETING TUBES AND MÖBIUS BANDS
- On a Certain Numerical Invariant of Link Types
- Knots
- A characterization of alternating links in thickened surfaces – CORRIGENDUM
