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Aspects of the Jones polynomialSacdalan, Alvin Mendoza 01 January 2006 (has links)
A knot invariant called the Jones polynomial will be defined in two ways, as the Kauffman Bracket polynomial and the Tutte polynomial. Three properties of the Jones polynomial are discussed. We also see how mutant knots share the same Jones polynomial.
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Differential topology : knot cobordismUngoed-Thomas, Rhidian Fergus Wolfe January 1967 (has links)
No description available.
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Conway's Link Polynomial: a Generalization of the Classic Alexander's Knot PolynomialWoodard, Mary Kay 12 1900 (has links)
The problem under consideration is that of determining a simple and effective invariant of knots. To this end, the Conway polynomial is defined as a generalization of Alexander's original knot polynomial. It is noted, however, that the Conway polynomial is not a complete invariant. If two knots are equivalent, as defined in this investigation, then they receive identical polynomials. Yet, if two knots have identical polynomials, no information about their equivalence may be obtained. To define the Conway polynomial, the Axioms for Computation are given and many examples of their use are included. A major result of this investigation is the proof of topological invariance of these polynomials and the proof that the axioms are sufficient for the calculation of the knot polynomial for any given knot or link.
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Khovanov homology and link cobordisms /Jacobsson, Magnus, January 2003 (has links)
Diss. (sammanfattning) Uppsala : Univ., 2003. / Härtill 3 uppsatser.
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