Hall 123

Fusion product of finite dimensional \mathfrak{g}[t] modules.

Rekha Biswal

IMSc

Feigin and Loktev conjectured that for a simple Lie algebra
\mathfrak{g}, fusion product of finite number of cyclic graded
\mathfrak{g}[t] modules is independent of the chosen parameters. In this
talk, I will present a proof of the conjecture for special type of cyclic
graded \mathfrak{g}[t] modules which is recently proved by Deniz Kus and
Peter Littelmann.