Maximality properties of generalised Springer representations of SO(N,C)

Abstract

The generalised Springer correspondence for G = SO(N,C) attaches to a pair (C,E), where C is a unipotent class of G and E is an irreducible G-equivariant local system on C, an irreducible representation (C,E) of a relative Weyl group of G. We call C the Springer support of (C,E). For each such (C,E), (C,E) appears with multiplicity 1 in the top cohomology of some variety. Let (C,E) be the representation obtained by summing over all cohomology groups of this variety. It is well-known that (C,E) appears in (C,E) with multiplicity 1 and that it is a `minimal subrepresentation' in the sense that its Springer support C is strictly minimal in the closure ordering among the Springer supports of the irreducbile subrepresentations of (C,E). Suppose C is parametrised by an orthogonal partition consisting of only odd parts. We prove that there exists a unique `maximal subrepresentation' (Cmax,Emax) of multiplicity 1 of (C,E). Let sgn be the sign representation of the relevant relative Weyl group. We also show that sgn (Cmax,Emax) is the minimal subrepresentation of sgn (C,E). These results are direct analogues of similar maximality and minimality results for Sp(2n,C) by Waldspurger.