International audienceThis paper gives a connection between well-chosen reductions of the Links–Gould invariants of oriented links and powers of the Alexander–Conway polynomial. This connection is obtained by showing the representations of the braid groups we derive the specialized Links–Gould polynomials from can be seen as exterior powers of a direct sum of Burau representations
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
In the 1920’s Artin defined the braid group, Bn, in an attempt to understand knots in a more algebra...
This thesis presents an investigation of many known polynomial invariants of knots and links. Follow...
International audienceThis paper gives a connection between well-chosen reductions of the Links–Goul...
International audienceIn this article, we conjecture that the Links–Gould invariant of links, which ...
International audienceIn this article, we conjecture that the Links–Gould invariant of links, which ...
On s’intéresse dans cette thèse aux rapports qui existent entre deux invariants d’entrelacs. D’une p...
In this thesis we focus on the connections that exist between two link invariants: first the Alexand...
In this thesis we focus on the connections that exist between two link invariants: first the Alexand...
In this thesis we focus on the connections that exist between two link invariants: first the Alexand...
Abstract We show that the Alexander-Conway polynomial ∆ is obtain-able via a particular one-variable...
Abstract We show that the Alexander-Conway polynomial ∆ is obtain-able via a particular one-variable...
We show that the Alexander-Conway polynomial Delta is obtainable via a particular one-variable reduc...
In the three main sections of this thesis (chapters II, III, and IV; chapter I consists of definitio...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
In the 1920’s Artin defined the braid group, Bn, in an attempt to understand knots in a more algebra...
This thesis presents an investigation of many known polynomial invariants of knots and links. Follow...
International audienceThis paper gives a connection between well-chosen reductions of the Links–Goul...
International audienceIn this article, we conjecture that the Links–Gould invariant of links, which ...
International audienceIn this article, we conjecture that the Links–Gould invariant of links, which ...
On s’intéresse dans cette thèse aux rapports qui existent entre deux invariants d’entrelacs. D’une p...
In this thesis we focus on the connections that exist between two link invariants: first the Alexand...
In this thesis we focus on the connections that exist between two link invariants: first the Alexand...
In this thesis we focus on the connections that exist between two link invariants: first the Alexand...
Abstract We show that the Alexander-Conway polynomial ∆ is obtain-able via a particular one-variable...
Abstract We show that the Alexander-Conway polynomial ∆ is obtain-able via a particular one-variable...
We show that the Alexander-Conway polynomial Delta is obtainable via a particular one-variable reduc...
In the three main sections of this thesis (chapters II, III, and IV; chapter I consists of definitio...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
In the 1920’s Artin defined the braid group, Bn, in an attempt to understand knots in a more algebra...
This thesis presents an investigation of many known polynomial invariants of knots and links. Follow...
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