Add to ORKGInternational audienceThe definition of the Jones polynomial in the 80's gave rise to a large family of so-called quantum link invariants, based on quantum groups. These quantum invariants are all controlled by the same two-variable invariant (the HOMFLY-PT polynomial), which also specializes to the older Alexander polynomial. Building upon quantum Schur--Weyl duality and variants of this phenomenon, I will explain an algebraic setup that allows for global definitions of these quantum polynomials, and discuss extensions of these quantum objects designed to encompass all of the mentioned invariants, including the HOMFLY-PT polynomial
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
We construct a category of quantum polynomial functors which deforms Fried-lander and Suslin’s categ...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
AbstractIn our previous work oriented quantum algebras were motivated and introduced in a very natur...
Many of the articles in this book are accessible to undergraduates who are working on research or ta...
A general method is developed for constructing quantum group invariants and determining their eigenv...
This report will spend the majority of its time discussing two polynomial invariants. First we will ...
We discuss the Jones-Conway polynomial, also known as Homfly polynomial. It is a knot invari-ant, an...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
It is shown that the knot invariant arising from an irreducible representation of a quantum group i...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
We construct a category of quantum polynomial functors which deforms Fried-lander and Suslin’s categ...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
International audienceOleg Viro studied in arXiv:math/0204290 two interpretations of the (multivaria...
AbstractIn our previous work oriented quantum algebras were motivated and introduced in a very natur...
Many of the articles in this book are accessible to undergraduates who are working on research or ta...
A general method is developed for constructing quantum group invariants and determining their eigenv...
This report will spend the majority of its time discussing two polynomial invariants. First we will ...
We discuss the Jones-Conway polynomial, also known as Homfly polynomial. It is a knot invari-ant, an...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
It is shown that the knot invariant arising from an irreducible representation of a quantum group i...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...
We construct a category of quantum polynomial functors which deforms Fried-lander and Suslin’s categ...
The Jones and HOMFLY polynomials are link invariants with close connections to quantum computing. It...