The Jones Polynomial is a knot/link invariant. This program is the direct implementation of the mathematical definitions and can be used for calculation.
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Feb 5, 2021 - Haskell
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knot-invariant
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Topologija (ne-anyonska) — knot invariants, Jones polinomijal, Temperley-Lieb (TL) algebra, Kauffman bracket.
topology quantum prediction lotto lottery loto jones-polynomial knot-invariant temperley-lieb kauffman
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Apr 22, 2026 - Python
An interactive website exploring knot theory: Reidemeister moves, the Alexander–Conway polynomial, the Jones polynomial, tricolorability, and the visual grammar of knot diagrams. · Built with Manus
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May 30, 2026 - TypeScript
Get the number of p-colourings invariant of a knot represented as a closure of a braid.
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Mar 12, 2024 - Rust
A reproducible, audit-first Python workbench for the invariants of smooth 4-dimensional topology — native Khovanov, Lee, Rasmussen s, and knot Floer homology for knots, links, and braids, validated against established tools.
python reproducible-research mathematics knot-theory concordance khovanov-homology computational-topology homological-algebra gauge-theory knot-invariant low-dimensional-topology heegaard-floer 4-manifolds knot-floer-homology
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Jun 24, 2026 - Python
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