Kei Yuen Chan scite author profile

For a connected semisimple algebraic group G over an algebraically closed field k and a fixed pair (B, B − ) of opposite Borel subgroups of G, we determine when the intersection of a conjugacy class C in G and a double coset BwB − is nonempty, where w is in the Weyl group W of G. The question comes from Poisson geometry, and our answer is in terms of the Bruhat order on W and an involution mC ∈ W associated to C. We prove that the element mC is the unique maximal length element in its conjugacy class in W , and we classify all such elements in W . For G = SL(n + 1, k), we describe mC explicitly for every conjugacy class C, and when w ∈ W ∼ = S n+1 is an involution, we give an explicit answer to when C ∩ (BwB) is nonempty.

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Iwahori component of the Gelfand–Graev representation

Chan

Savin

2017

Math. Z.

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Kei Yuen Chan

Bernstein–Zelevinsky Derivatives: a Hecke Algebra Approach

On intersections of conjugacy classes and bruhat cells

Iwahori component of the Gelfand–Graev representation

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