Add to ORKGFor a quasi-split Satake diagram, we define a modified $q$-Weyl algebra, and show that there is an algebra homomorphism between it and the corresponding $\imath$quantum group. In other words, we provide a differential operator approach to $\imath$quantum groups. Meanwhile, the oscillator representations of $\imath$quantum groups are obtained. The crystal basis of the irreducible subrepresentations of these oscillator representations are constructed
This paper begins a study of one- and two-variable function space models of irreducible representati...
The Lie algebra su(1, 1) can be deformed by a reflection operator, in such a way that the positive d...
The universal R operator for the positive representations of split real quantum groups is computed, ...
We establish automorphisms with closed formulas on quasi-split $\imath$quantum groups of symmetric K...
With applications in quantum field theory, general relativity and elementary particle physics, this ...
To construct a quantum group gauge theory one needs an algebra which is invariant under gauge transf...
For any simple Lie algebra g and any complex number q which is not zero or a nontrivial root of unit...
A quantum symmetric pair consists of a quantum group $\mathbf U$ and its coideal subalgebra ${\mathb...
For any simple Lie algebra g and any complex number q which is not zero or a nontrivial root of unit...
We introduce a category $\widehat{\mathcal{O}}_{\rm osc}$ of $q$-oscillator representations of the q...
With applications in quantum field theory, elementary particle physics and general relativity, this ...
AbstractWe construct a functor from a certain category of quantum semigroups to a category of quantu...
Doctor of PhilosophyDepartment of MathematicsZongzhu LinThe Weyl algebra is the algebra of different...
The Lie algebra su(1, 1) can be deformed by a reflection operator, in such a way that the positive d...
A quantum symmetric pair consists of a quantum group $\mathbf U$ and its coideal subalgebra ${\mathb...
This paper begins a study of one- and two-variable function space models of irreducible representati...
The Lie algebra su(1, 1) can be deformed by a reflection operator, in such a way that the positive d...
The universal R operator for the positive representations of split real quantum groups is computed, ...
We establish automorphisms with closed formulas on quasi-split $\imath$quantum groups of symmetric K...
With applications in quantum field theory, general relativity and elementary particle physics, this ...
To construct a quantum group gauge theory one needs an algebra which is invariant under gauge transf...
For any simple Lie algebra g and any complex number q which is not zero or a nontrivial root of unit...
A quantum symmetric pair consists of a quantum group $\mathbf U$ and its coideal subalgebra ${\mathb...
For any simple Lie algebra g and any complex number q which is not zero or a nontrivial root of unit...
We introduce a category $\widehat{\mathcal{O}}_{\rm osc}$ of $q$-oscillator representations of the q...
With applications in quantum field theory, elementary particle physics and general relativity, this ...
AbstractWe construct a functor from a certain category of quantum semigroups to a category of quantu...
Doctor of PhilosophyDepartment of MathematicsZongzhu LinThe Weyl algebra is the algebra of different...
The Lie algebra su(1, 1) can be deformed by a reflection operator, in such a way that the positive d...
A quantum symmetric pair consists of a quantum group $\mathbf U$ and its coideal subalgebra ${\mathb...
This paper begins a study of one- and two-variable function space models of irreducible representati...
The Lie algebra su(1, 1) can be deformed by a reflection operator, in such a way that the positive d...
The universal R operator for the positive representations of split real quantum groups is computed, ...