Date:
Mon, 28/11/202214:30-15:30
Location:
Ross 70 and Zoom
Title: Bases, polytopes and toric degenerations.
Abstract: Finite dimensional irreducible modules of the Lie algebra sl(n) are of the key importance for the representation theory of simple Lie algebras.
We will construct monomial bases of the modules compatible with the induced Poincaré–Birkhoff–Witt filtration. The bases are given in terms of certain convex polytopes. We will explain the connection between the projective toric varieties associated to the above polytopes and the classical flag varieties.
Based on joint works with Ghislain Fourier and Peter Littelmann.
Abstract: Finite dimensional irreducible modules of the Lie algebra sl(n) are of the key importance for the representation theory of simple Lie algebras.
We will construct monomial bases of the modules compatible with the induced Poincaré–Birkhoff–Witt filtration. The bases are given in terms of certain convex polytopes. We will explain the connection between the projective toric varieties associated to the above polytopes and the classical flag varieties.
Based on joint works with Ghislain Fourier and Peter Littelmann.