Knots!
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This document provides an introduction to knot theory, covering its history, different types of knots including braids and links, properties like handedness, knot invariants such as the Alexander-Conway polynomial, and applications including modeling chirality in molecules and DNA and potential uses in quantum computing. It discusses key topics like the unknot, the trefoil knot, and Reidemeister moves.
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Knots!
- 1. Knot Theory An introduction
- 2. A brief history of knots
- 4. Take 2
- 5. Types of knot Braids Links
- 6. The Unknot
- 7. The Trefoil Left-handed Right-handed
- 9. Reidermeister Moves I II III
- 10. The Alexander- Conway Polynomial C(L+) = C(L-) + zC(L0)
- 11. A worked example C( ) = C( ) + zC( ) C( ) = C( ) + zC( ) C( ) = C( ) + zC( ) C( ) = 1 + z(0 + z)
- 13. DNA
- 14. Quantum Computing ?!?
Notas del editor
- Eternal knot – Tibetan Buddhism Borromean Rings - Unity. Christianity. Valknut, Norse. Book of kells
- Peter Guthrie Tait + William Thomson, 1st baron of Kelvin (Lord Kelvin) 1867. Luminiferous aether, knots and molecules. 1902 - No balloon or aeroplane will ever be successful
- 1927 Topology - polymath Poincare, conjecture James Waddell Alexander II - Princeton, keen climber, socialist, mccarthy, recluse Kurt Reidermeister – Konigsberg, Nazis
- Braids Links Topologically similar
- Alice in Wonderland Unknotted knot The basis for all other knots
- next simplest knot chiral, important any way you flip it
- knot spotting large part of theory prime knots knowing what it is, important
- Basic moves Prime knot
- John Conway - Princeton, game of life Crossings Knot invariant Jones Polynomial - harder
- Left hand is 1 - z^2
- Thalidomide - Cure, Birth defects Flavouring - Peppermint, Orange
- DNA/RNA Helps to untangle, see what’s going on
- Can’t possibly explain this!