Add to ORKGWe discuss the Jones-Conway polynomial, also known as Homfly polynomial. It is a knot invari-ant, an...
Knot theory arguably holds claim to the title of the mathematical discipline with the most unusually...
We use the technique of quantum skew Howe duality to investigate the monoidal category generated by ...
Instructional notes based on a series of lectures in Trieste in 2009. They are primarily an account ...
Instructional notes based on a series of lectures in Trieste in 2009. They are primarily an account ...
Instructional notes based on a series of lectures in Trieste in 2009. They are primarily an account ...
International audienceThe definition of the Jones polynomial in the 80's gave rise to a large family...
Since the discovery of the Jones polynomial [15], the quantum $\mathrm{g}\mathrm{r}o$up has $\dot{\m...
Results of Kirillov and Reshetikhin on constructing invariants of framed links from the quantum grou...
We analyze the connections between the mathematical theory of knots and quantum physics by addressin...
AbstractResults of Kirillov and Reshetikhin on constructing invariants of framed links from the quan...
In 1984 Jones discovered a polynomial invariant of knots, which resembled none of the formerly known...
We consider the problem of distinguishing mutant knots using invariants of their satellites. We sho...
Both the Alexander polynomial and the colored Jones polynomial are well-known knot invariants. While...
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...
Knot theory arguably holds claim to the title of the mathematical discipline with the most unusually...
We use the technique of quantum skew Howe duality to investigate the monoidal category generated by ...
Instructional notes based on a series of lectures in Trieste in 2009. They are primarily an account ...
Instructional notes based on a series of lectures in Trieste in 2009. They are primarily an account ...
Instructional notes based on a series of lectures in Trieste in 2009. They are primarily an account ...
International audienceThe definition of the Jones polynomial in the 80's gave rise to a large family...
Since the discovery of the Jones polynomial [15], the quantum $\mathrm{g}\mathrm{r}o$up has $\dot{\m...
Results of Kirillov and Reshetikhin on constructing invariants of framed links from the quantum grou...
We analyze the connections between the mathematical theory of knots and quantum physics by addressin...
AbstractResults of Kirillov and Reshetikhin on constructing invariants of framed links from the quan...
In 1984 Jones discovered a polynomial invariant of knots, which resembled none of the formerly known...
We consider the problem of distinguishing mutant knots using invariants of their satellites. We sho...
Both the Alexander polynomial and the colored Jones polynomial are well-known knot invariants. While...
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...
Knot theory arguably holds claim to the title of the mathematical discipline with the most unusually...
We use the technique of quantum skew Howe duality to investigate the monoidal category generated by ...