For a finite field k and a triple of integers g \ge r \ge s \ge 0, we count
the number of semilinear endomorphisms of a g-dimensional k-vector space which
have rank r and stable rank s. Such endomorphisms show up naturally in the
classification of finite flat group schemes of p-power order over k which are
killed by p and have p-rank s, via Dieudonne theory

Holland, Timothy

English

arXiv

Fix a prime p and finite field k of order q: = pr. For a field automorphism τ of k and a k-vector space V of dimension g, we will write Endτ (V) for the set of τ-semilinear endomorphisms of V; that is, additive maps F: V → V which satisfy F (αv)  = τ(α)  · F (v) for all v ∈ V and α ∈ k. As τ is an automorphism, the kernel and image (as sets, say) of any τ-semilinear map F are bot

Counting Semilinear Endomorphisms Over Finite Fields

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