Anthony Henderson (University of Sydney)
The modular generalized Springer correspondence
Given a connected reductive algebraic group \(G\) with Weyl group \(W\), the Springer correspondence realizes the category of representations of \(W\) as a quotient of the category of \(G\)-equivariant perverse sheaves on the nilpotent cone. In the original definition, the representations and sheaves were over a field of characteristic zero, but it has recently been shown that the same formalism works with modular coefficients, where the categories are no longer semisimple. In the characteristic-zero case, Lusztig defined a generalized Springer correspondence to interpret the whole category of \(G\)-equivariant perverse sheaves on the nilpotent cone in terms of representations of relative Weyl groups. We define and determine a modular generalized Springer correspondence in the case \(G=\mathrm{GL}(n)\). This is joint work with P. Achar, D. Juteau and S. Riche.
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John Enyang John.Enyang@sydney.edu.au