|
|
| Date: | Thu, November 2, 2017 |
| Time: | 11:15 |
| Place: | Seminar Room (120), Research I |
Abstract: Abstract: Let \(\frak{g}\) be a Lie superalgebra and \(A\) be an associative, commutative unital algebra, both defined over the same ground field. We call the Lie superalgebra \(\frak{g}\otimes A\) a map Lie superalgebra. These Lie superalgebras generalizes various well known Lie superalgebras, such as loop and current superalgebras. In this talk I will present the classification of all irreducible finite-dimensional representations of such superalgebras for the case where \(\frak{g}\) is a classical simple Lie superalgebra. At the end I also wold like to make some comments about the twisted version of such superalgebras.