Gwyn Bellamy, Johannes Schmitt, Ulrich Thiel
Published 2021-12-02, updated 2022-12-02Version 2
Using Cohen's classification of symplectic reflection groups, we prove that the parabolic subgroups, that is, stabilizer subgroups, of a finite symplectic reflection group are themselves symplectic reflection groups. This is the symplectic analogue of Steinberg's Theorem for complex reflection groups. Using computational results required in the proof, we show the non-existence of symplectic resolutions for symplectic quotient singularities corresponding to three exceptional symplectic reflection groups, thus reducing further the number of cases for which the existence question remains open. Another immediate consequence of our result is that the singular locus of the symplectic quotient singularity associated to a symplectic reflection group is pure of codimension two.
Comments: To appear in Glasgow Math. J
Planar boundaries and parabolic subgroups
On growth types of quotients of Coxeter groups by parabolic subgroups
Hyperbolicity of the complex of parabolic subgroups of Artin-Tits groups of type $B$
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