Parabolic induction for Springer fibres
Abstract
Let G be a reductive group satisfying the standard hypotheses, with Lie algebra g. For each nilpotent orbit O0 in a Levi subalgebra g0 we can consider the induced orbit O defined by Lusztig and Spaltenstein. We observe that there is a natural closed morphism of relative dimension zero from the Springer fibre over a point of O0 to the Springer fibre over O, which induces an injection on the level of irreducible components. When G = GLN the components of Springer fibres was classified by Spaltenstein using standard tableaux. Our main results explains how the Lusztig--Spaltenstein map of Springer fibres can be described combinatorially, using a new associative composition rule for standard tableaux which we call stacking.
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