Knot theory programs KNOT2000 (K2K) + LinKnot(K2K)+LinKnot(K2KC)
S. Jablan, R. Sazdanovic (2003)
Visual Mathematics
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Displaying similar documents to “Minimal degree sequence for 2-bridge knots”
Knot theory programs KNOT2000 (K2K) + LinKnot(K2K)+LinKnot(K2KC)
Mp-small summands increase knot width.
Hendricks, Jacob (2004)
Algebraic & Geometric Topology
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Every knot is a billiard knot
P. V. Koseleff, D. Pecker (2014)
Banach Center Publications
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We show that every knot can be realized as a billiard trajectory in a convex prism. This proves a conjecture of Jones and Przytycki.
Representation of -knots.
Mulazzani, Michele (2006)
Sibirskie Ehlektronnye Matematicheskie Izvestiya [electronic only]
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Spacefilling knots.
Schmitt, Peter (1997)
Beiträge zur Algebra und Geometrie
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Positive knots, closed braids and the Jones polynomial
Alexander Stoimenow (2003)
Annali della Scuola Normale Superiore di Pisa - Classe di Scienze
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Using the recent Gauß diagram formulas for Vassiliev invariants of Polyak-Viro-Fiedler and combining these formulas with the Bennequin inequality, we prove several inequalities for positive knots relating their Vassiliev invariants, genus and degrees of the Jones polynomial. As a consequence, we prove that for any of the polynomials of Alexander/Conway, Jones, HOMFLY, Brandt-Lickorish-Millett-Ho and Kauffman there are only finitely many positive knots with the same polynomial and no...
Turk's-head Knots (Braided Band Knots) a Mathematical Modeling
Skip Pennock (2005)
Visual Mathematics
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Minimizing the presentation of a knot group.
Dugopolski, Mark J. (1985)
International Journal of Mathematics and Mathematical Sciences
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Projections of knots
Dennis Roseman (1975)
Fundamenta Mathematicae
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Lissajous knots and billiard knots
Vaughan Jones, Józef Przytycki (1998)
Banach Center Publications
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We show that Lissajous knots are equivalent to billiard knots in a cube. We consider also knots in general 3-dimensional billiard tables. We analyse symmetry of knots in billiard tables and show in particular that the Alexander polynomial of a Lissajous knot is a square modulo 2.
Unknotting number and knot diagram.
Yasutaka Nakanishi (1996)
Revista Matemática de la Universidad Complutense de Madrid
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This note is a continuation of a former paper, where we have discussed the unknotting number of knots with respect to knot diagrams. We will show that for every minimum-crossing knot-diagram among all unknotting-number-one two-bridge knot there exist crossings whose exchange yields the trivial knot, if the third Tait conjecture is true.
Edge number results for piecewise-Linear knots
Monica Meissen (1998)
Banach Center Publications
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The minimal number of edges required to form a knot or link of type K is the edge number of K, and is denoted e(K). When knots are drawn with edges, they are appropriately called piecewise-linear or PL knots. This paper presents some edge number results for PL knots. Included are illustrations of and integer coordinates for the vertices of several prime PL knots.