Independence polynomials and Alexander-Conway polynomials of plumbing links
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Publication:2040496
DOI10.1016/j.jcta.2021.105487zbMath1472.05079OpenAlexW3168388321MaRDI QIDQ2040496
Publication date: 14 July 2021
Published in: Journal of Combinatorial Theory. Series A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcta.2021.105487
Alexander polynomialline graphpolynomial rootalternating knotindependence polynomial2-bridge linkarborescent link
Graph polynomials (05C31) Vertex subsets with special properties (dominating sets, independent sets, cliques, etc.) (05C69) Graph operations (line graphs, products, etc.) (05C76) Knot polynomials (57K14)
Cites Work
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- Mehler formulae for matching polynomials of graphs and independence polynomials of clawfree graphs
- On Coxeter mapping classes and fibered alternating links
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- On the genus of the alternating knot. I
- Newton-like polynomials of links
- The roots of the independence polynomial of a clawfree graph
- Square numbers and polynomial invariants of achiral knots
- Genus of alternating link types
- Sur les valeurs propres de la transformation de Coxeter
- Hoste's conjecture and roots of link polynomials
- Alternating knots with Alexander polynomials having unexpected zeros
- Signature jumps and Alexander polynomials for links
- Application of Braiding Sequences. II. Polynomial Invariants of Positive Knots
- Diagram genus, generators and applications
- The First Coefficient of the Conway Polynomial
- Hoste’s conjecture for the 2-bridge knots
- Hoste’s conjecture for generalized Fibonacci polynomials
- On the topological invariance of Murasugi special components of an alternating link
- LOG-CONCAVITY AND ZEROS OF THE ALEXANDER POLYNOMIAL
- Signature, positive Hopf plumbing and the Coxeter transformation (With appendix by Peter Feller and Livio Liechti)
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