Counting conjugacy classes in the unipotent radical of parabolic subgroups of n(q)
Abstract
Let q be a power of a prime p. Let P be a parabolic subgroup of the general linear group n(q) that is the stabilizer of a flag in qn of length at most 5, and let U = Op(P). In this note we prove that, as a function of q, the number k(U) of conjugacy classes of U is a polynomial in q with integer coefficients.
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