AbstractThe structure of the tensor product representation Vλ1(x)⊗Vλ2(y) of Uq(sl̂2) is investigated at roots of unity. A polynomial identity is derived as an outcome. Also, new bases of Vλ1(x)⊗Vλ2(y) are established under certain conditions
The study of symmetries is an essential tool in modern physics. The analysis of symmetries is often ...
The study of symmetries is an essential tool in modern physics. The analysis of symmetries is often ...
39 pagesInternational audienceAn infinite dimensional algebra denoted $\bar{\cal A}_q$ that is isomo...
The structure of the tensor product representation V-gimel1(x) circle times V-gimel2(y) of U-q(s (l)...
When q is a root of unity, a triangular decomposition of U-q(s (l) over cap(2)) is given and irreduc...
AbstractWe work out examples of tensor products of distinct generalized slq(2) algebras with a facto...
Using the tensor product variety introduced in Malkin (Duke Math. J., to appear) and Nakajima (Inven...
AbstractUsing the realization of positive discrete series representations of su(1,1) in terms of a c...
Irreducible representations of quantum groups $SL_q(2)$ (in Woronowicz' approach) were classified in...
In this master thesis I have looked on two different kinds of representations of the Lie algebras su...
In this master thesis I have looked on two different kinds of representations of the Lie algebras su...
A new approach to the theory of polynomial solutions of q{dierence equations is proposed. The approa...
Some time ago, Rideau and Winternitz introduced a realization of the quantum algebra suq(2) on a rea...
Available from British Library Document Supply Centre-DSC:DXN021432 / BLDSC - British Library Docume...
So far in this course we have given a very general theory of compact Lie groups and their representa...
The study of symmetries is an essential tool in modern physics. The analysis of symmetries is often ...
The study of symmetries is an essential tool in modern physics. The analysis of symmetries is often ...
39 pagesInternational audienceAn infinite dimensional algebra denoted $\bar{\cal A}_q$ that is isomo...
The structure of the tensor product representation V-gimel1(x) circle times V-gimel2(y) of U-q(s (l)...
When q is a root of unity, a triangular decomposition of U-q(s (l) over cap(2)) is given and irreduc...
AbstractWe work out examples of tensor products of distinct generalized slq(2) algebras with a facto...
Using the tensor product variety introduced in Malkin (Duke Math. J., to appear) and Nakajima (Inven...
AbstractUsing the realization of positive discrete series representations of su(1,1) in terms of a c...
Irreducible representations of quantum groups $SL_q(2)$ (in Woronowicz' approach) were classified in...
In this master thesis I have looked on two different kinds of representations of the Lie algebras su...
In this master thesis I have looked on two different kinds of representations of the Lie algebras su...
A new approach to the theory of polynomial solutions of q{dierence equations is proposed. The approa...
Some time ago, Rideau and Winternitz introduced a realization of the quantum algebra suq(2) on a rea...
Available from British Library Document Supply Centre-DSC:DXN021432 / BLDSC - British Library Docume...
So far in this course we have given a very general theory of compact Lie groups and their representa...
The study of symmetries is an essential tool in modern physics. The analysis of symmetries is often ...
The study of symmetries is an essential tool in modern physics. The analysis of symmetries is often ...
39 pagesInternational audienceAn infinite dimensional algebra denoted $\bar{\cal A}_q$ that is isomo...
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