AbstractThe Jones polynomial was originally defined by constructing a Markov trace on the sequence of Temperley-Lieb algebras. In this paper we give a programme for constructing other link invariants by the same method. The data for the constructions is a representation of the three string braid group
We study representations of the loop braid group LBn from the perspective of extending representatio...
International audienceLet [Formula: see text] be the algebra of Laurent polynomials in the variable ...
The construction of link polynomials associated with finite dimensional representations of ribbon qu...
This work provides the topological background and a preliminary study for the analogue of the 2-vari...
We define a finite-dimensional cubic quotient of the group algebra of the braid group, endowed with ...
We define a finite-dimensional cubic quotient of the group algebra of the braid group, endowed with ...
The Jones polynomial is a special topological invariant in the field of Knot Theory. Created by Vaug...
We define a finite-dimensional cubic quotient of the group algebra of the braid group, endowed with ...
Let R f = Z[A ±1 ] be the algebra of Laurent polynomials in the variable A and let R a = Z[A ±1 , z ...
Let R f = Z[A ±1 ] be the algebra of Laurent polynomials in the variable A and let R a = Z[A ±1 , z ...
In the 1920’s Artin defined the braid group, Bn, in an attempt to understand knots in a more algebra...
AbstractIn this paper we consider the question of faithfulness of the Jones' representation of braid...
AbstractIn this paper we consider the question of faithfulness of the Jones' representation of braid...
We use the machinery of categorified Jones-Wenzl projectors to construct a categorification of a typ...
International audienceLet [Formula: see text] be the algebra of Laurent polynomials in the variable ...
We study representations of the loop braid group LBn from the perspective of extending representatio...
International audienceLet [Formula: see text] be the algebra of Laurent polynomials in the variable ...
The construction of link polynomials associated with finite dimensional representations of ribbon qu...
This work provides the topological background and a preliminary study for the analogue of the 2-vari...
We define a finite-dimensional cubic quotient of the group algebra of the braid group, endowed with ...
We define a finite-dimensional cubic quotient of the group algebra of the braid group, endowed with ...
The Jones polynomial is a special topological invariant in the field of Knot Theory. Created by Vaug...
We define a finite-dimensional cubic quotient of the group algebra of the braid group, endowed with ...
Let R f = Z[A ±1 ] be the algebra of Laurent polynomials in the variable A and let R a = Z[A ±1 , z ...
Let R f = Z[A ±1 ] be the algebra of Laurent polynomials in the variable A and let R a = Z[A ±1 , z ...
In the 1920’s Artin defined the braid group, Bn, in an attempt to understand knots in a more algebra...
AbstractIn this paper we consider the question of faithfulness of the Jones' representation of braid...
AbstractIn this paper we consider the question of faithfulness of the Jones' representation of braid...
We use the machinery of categorified Jones-Wenzl projectors to construct a categorification of a typ...
International audienceLet [Formula: see text] be the algebra of Laurent polynomials in the variable ...
We study representations of the loop braid group LBn from the perspective of extending representatio...
International audienceLet [Formula: see text] be the algebra of Laurent polynomials in the variable ...
The construction of link polynomials associated with finite dimensional representations of ribbon qu...
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