On the proportion of derangements in affine classical groups

Abstract

We derive exact formulas for the proportions of derangements and of derangements of p-power order in the affine classical groups AUm(q), ASp2m(q), AO2m+1(q) and AO2m(q), where p denotes the characteristic of the defining finite field. In the unitary case, the formulas rely on a result on partitions of independent interest: we obtain a generating function for integer partitions λ=(λ1, …, λm) into m parts, with λ1 … λm, such that either λ1=1 or λk-1>λk=k for some k ∈ \2, …,m\. In the symplectic and orthogonal cases, the proofs of the formulas reduce to verifying three q-polynomial identities conjectured by the author and later proved by Fulman and Stanton.