Jie Du (UNSW)
Representations of \(q\)-Schur superalgebras at a root of unity
I will report on a classification of irreducible representations over the \(q\)-Schur superalgebra at a root of unity. We simply apply the relative norm map introduced by P. Hoefsmit and L. Scott in 1977. This map is the \(q\)-analogue of the usual trace map which has many important properties related to Mackey decomposition, Frobenius reciprocity, Nakayama relation, Higman's criterion, and so on. By describing a basis for the \(q\)-Schur superalgebra in terms of relative norms, we may filter the algebra with a linear sequence of ideals associated with \(l\)-parabolic subgroups. In this way, we may attach a defect group to a primitive idempotent. Primitive idempotents with the trivial defect group can be classified by \(l\)-regular partitions, and others can be classified via Brauer homomorphisms.
This is joint work with H. Gu and J. Wang.
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We will take the speaker to lunch after the talk.
See the Algebra Seminar web page for information about other seminars in the series.
John Enyang [email protected]