Quantum affine algebras are important examples of Drinfeld-Jimbo quantum groups.
They can be defined as quantizations of affine Kac-Moody algebras or as affinizations of
finite type quantum groups (Drinfeld Theorem). The representation theory of quantum
affine algebras is very rich. It has been studied intensively during the past twenty five
years from different point of views, in particular in connections with various fields in
mathematics and in physics, such as geometry (geometric representation theory, geometric
Langlands program), topology (invariants in small dimension), combinatorics (crystals,
positivity problems) and theoretical physics (Bethe Ansatz, integrable systems).
In particular, the category C of finite-dimensional representations of a quantum affine
algebra is one of the most studied object in quantum groups theory. However, many
important and fundamental questions are still unsolved in this field. The aim of the
research project is to make significant advances in the understanding of the category C as
well as of its applications in the following five directions.
They seem to us to be the most promising directions for this field in the next years :
1. Asymptotical representations and applications to quantum integrable systems,
2. G-bundles on elliptic curves and quantum groups at roots of 1,
3. Categorifications (of cluster algebras and of quantum groups),
4. Langlands duality for quantum groups,
5. Proof of (geometric) character formulas and applications.
In these directions, significant advances have been mage.
The main results of the project are :
(A) Frenkel-Hernandez : the proof of a remarkable system of relations implying the conjectural Bethe Ansatz equations for quantum integrable models.
(B) Hernandez-Leclerc and Hernandez : the Grothendieck ring of a certain monoidal subcategory O has the
structure of a cluster algebra. Certain cluster relations were then categorified in terms of new R-matrices obtained from algebraic stable maps.
(C) Hernandez-Oya and Fujita-Hernandez-Oh-Oya : we established isomorphisms of quantum Grothendieck rings
preserving canonical basis. Combining with recent results in terms of generalized Schur-Weyl dualities, we established the validity of a
Kazdhan-Lusztig algorithm for characters of simple modules in a monoidal category of representations in type B (this was conjectured in 2002) and
a related positivity conjecture for general types.
Two phD-thesis funded by the project were defended.