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Ihre Aktion | Suchen (DDC synthetisch (XSDC)) 514/.224 |
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1. |
Knot theory Manturov, V. O.. - Boca Raton, Fla. [u.a.] : Chapman & Hall/CRC, 2004 |
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2. |
Why are braids orderable ? Dehornoy, Patrick *1912-1967*. - Paris : Société Mathématique de France, 2002 |
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3. |
Knots and physics Kauffman, Louis H. *1945-*. - 3. ed. - Singapore [u.a.] : World Scientific, 2001 |
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4. |
Functional knot theory : categories of tangles, coherence, categorical deformations, and topological invariants Yetter, David N. - Singapore [u.a.] : World Scientific, 2001 |
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5. |
Braids and self-distributivity Dehornoy, Patrick *1912-1967*. - Basel : Birkhäuser, 2000 |
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6. |
The mystery of knots : computer programming for knot tabulation Aneziris, Charilaos N.. - Singapore [u.a.] : World Scientific, 1999 |
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7. |
A study of braids Murasugi, Kunio *1929-*. - Dordrecht [u.a.] : Kluwer Academic Publishers, 1999 |
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8. |
Die Entstehung der Knotentheorie : Kontexte und Konstruktionen einer modernen mathematischen Theorie Epple, Moritz. - Braunschweig : Vieweg, 1999 |
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9. |
High-dimensional knot theory : algebraic surgery in codimension 2 Ranicki, Andrew *1948-2018*. - Berlin : Springer, 1998 |
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10. |
Knotted surfaces and their diagrams Carter, J. Scott *1956-*. - Providence, R.I. : American Mathematical Society, 1998 |
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