Milnor numbers, spanning trees, and the Alexander-Conway polynomial.
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Publication:1421392
DOI10.1016/S0001-8708(03)00019-7zbMath1041.57005arXivmath/0111102OpenAlexW1992723689MaRDI QIDQ1421392
Gregor Masbaum, Arkady Vaintrob
Publication date: 26 January 2004
Published in: Advances in Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0111102
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Applications of the Casson-Walker invariant to the knot complement and the cosmetic crossing conjectures ⋮ Generating functions and counting formulas for spanning trees and forests in hypergraphs ⋮ On the Tutte-Krushkal-Renardy polynomial for cell complexes ⋮ FINITE TYPE INVARIANTS AND MILNOR INVARIANTS FOR BRUNNIAN LINKS ⋮ Milnor invariants and the HOMFLYPT polynomial ⋮ n-QUASI-ISOTOPY II: COMPARISON
Cites Work
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- The Conway potential function for links
- Concordance invariance of coefficients of Conway's link polynomial
- Homotopy invariants of links
- A factorization of the Conway polynomial
- The universal Vassiliev invariant for the Lie superalgebra \(gl(1|1)\)
- The Kontsevich integral and Milnor's invariants
- On the Vassiliev knot invariants
- On the Melvin-Morton-Rozansky conjecture
- Link groups
- Milnor's Invariants and the Completions of Link Modules
- The Classification of Links up to Link-Homotopy
- The First Coefficient of the Conway Polynomial
- Melvin–Morton Conjecture and Primitive Feynman Diagrams
- Cabling the Vassiliev Invariants
- VASSILIEV HOMOTOPY STRING LINK INVARIANTS
