AbstractA NEW combinatorial formulation of the Jones polynomial of a link is used to establish some basic properties of this polynomial. A striking consequence of these properties is the result that a link admitting an alternating diagram with m crossings and with no “nugatory” crossing cannot be projected with fewer than m crossings
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
There have been many attempts to settle the question whether there exist nontrivial knots with trivi...
AbstractMorton and Franks–Williams independently gave a lower bound for the braid index b(L) of a li...
AbstractA NEW combinatorial formulation of the Jones polynomial of a link is used to establish some ...
AbstractIn this paper we use the orientation of a link to introduce an additional structure on Kauff...
AbstractThe Jones polynomial of an alternating link is a certain specialization of the Tutte polynom...
In this section we introduce the Jones polynomial a link invariant found by Vaughan Jones in 1984. L...
A knot invariant called the Jones polynomial will be defined in two ways, as the Kauffman Bracket po...
The Jones polynomial of an alternating link is a certain specialization of the Tutte polynomial of t...
The problem of finding the crossing number of an arbitrary knot or link is a hard problem in general...
AbstractWe study the parametrized complexity of the knot (and link) polynomials known as Jones polyn...
AbstractMorton and Franks–Williams independently gave a lower bound for the braid index b(L) of a li...
Let D be a link diagram with n crossings, sA and sB be its extreme states and |sAD| (respectively, |...
In [2] Armond showed that the heads and tails of the colored Jones polynomial exist for adequate lin...
grantor: University of TorontoThe two main approaches to knot theory, via local moves (Re...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
There have been many attempts to settle the question whether there exist nontrivial knots with trivi...
AbstractMorton and Franks–Williams independently gave a lower bound for the braid index b(L) of a li...
AbstractA NEW combinatorial formulation of the Jones polynomial of a link is used to establish some ...
AbstractIn this paper we use the orientation of a link to introduce an additional structure on Kauff...
AbstractThe Jones polynomial of an alternating link is a certain specialization of the Tutte polynom...
In this section we introduce the Jones polynomial a link invariant found by Vaughan Jones in 1984. L...
A knot invariant called the Jones polynomial will be defined in two ways, as the Kauffman Bracket po...
The Jones polynomial of an alternating link is a certain specialization of the Tutte polynomial of t...
The problem of finding the crossing number of an arbitrary knot or link is a hard problem in general...
AbstractWe study the parametrized complexity of the knot (and link) polynomials known as Jones polyn...
AbstractMorton and Franks–Williams independently gave a lower bound for the braid index b(L) of a li...
Let D be a link diagram with n crossings, sA and sB be its extreme states and |sAD| (respectively, |...
In [2] Armond showed that the heads and tails of the colored Jones polynomial exist for adequate lin...
grantor: University of TorontoThe two main approaches to knot theory, via local moves (Re...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
There have been many attempts to settle the question whether there exist nontrivial knots with trivi...
AbstractMorton and Franks–Williams independently gave a lower bound for the braid index b(L) of a li...
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