Representation TheoryNilpotent orbits in characteristic 2 and Springer correspondenceTing Xue, MIT
Let k and F_q be an algebraically closed and
a finite field of characteristic 2 respectively. Let G be an
adjoint (resp. simply connected) algebraic group of type B,C or
D over k, g the Lie algebra of G and
g^* the dual vector space of g. We
construct the Springer correspondence for g (resp.
g^*) following Lusztig's method. The correspondence is
a bijective map from the set A_g (resp.
A_g^*) to the set of irreducible
characters of the Weyl group of G, where
A_g (resp.
A_g^*) is the set of all pairs
(c,F) with c a nilpotent G-orbit
in g (resp. g^*) and F an
irreducible G-equivariant local system on c (up to
isomorphism). In particular, we obtain classifications of nilpotent
orbits in orthogonal Lie algebras over F_q and in the
duals of classical Lie algebras over k and
F_q. Finally, we describe the explicit correspondence
using similar combinatorics that appears in the description of
generalized Springer correspondence (defined by Lusztig) for
classical groups in the case of characteristic not equal 2 and
unipotent case in characteristic 2.
4:00pm–5:00pm, Monday, November 9, 2009 in LGRT 1322
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