q-Varieties and Drinfeld Modules

Abstract

Let Fq be the finite field with q elements, K be an algebraically closed field containing Fq, K\τ\ be the Ore ring of Fq-linear polynomials and n be a free K\τ\-module of rank n. In a first part, we prove that there is a bijection between the set of Zariski closed subsets of Kn which are also Fq-vector spaces, the so-called q-varities, and the set of radical K\τ\-submodules of n. We also study the dimension of q-varieties and their tangent spaces. Let F be a q-variety, K\F\ := Mor(F,K) be the set of Fq-linear polynomial maps from F to K. Let A=Fq[T] and choose δ : A K a ring morphism. By definition, an A-module structure on F is a ring morphism : A End(F) such that, for all a∈ A, d(a) = δ(a) IdT(F) where T(F) is the tangent space of F and d(a) the differential map. We prove that K(F) := K(T)K[T]K\F\ has finite dimension over K(T). This dimension is called the rank of the A-module and is denoted by r(F). We then prove that there exists c ∈ A \0\ such that for all a∈ A, prime to c, Tor(a,F) := \x∈ F a(x) = 0\ = (A/aA)r(F).