Cluster algebras with coefficients and relative Calabi-Yau structures
De Bernhard Keller
Combinatorics and quantum invariant differential operators on Reflection Equation algebras
De Dimitry Gurevich
De Cristian Vay
Apparaît dans la collection : Representation theory of generalized small quantum groups
We will begin the course by exploring the very rich Representation Theory of the graded finite-dimensional algebras with triangular decomposition. We will follow mainly [1]. These algebras have plenty of powerful and beautiful methods and results inspired in Lie Theory (characters, Verma module, BGG Reciprocity, etc).
Then we will introduce some examples of Hopf algebras with triangular decomposition based on [2]. Among these, we will focus on the Drinfeld doubles of the bosonization of a finite- dimensional Nichols algebra over a semisimple Hopf algebra. We will investigate peculiar features which appear in this setting (duality and tensor product).