On the Weil descent of Artin-Schreier algebraic function fields over finite fields
Abstract
Let us consider a generalized Artin-Schreier algebraic function field extension F of the rational function field pn(x) defined over the finite field extension K=pn of the prime field p. We assume that K is algebraically closed in F. We give general results on the descent over the fields k= pt for t dividing n. Then, we completely handle the bi-cyclic case of the descent over the fields k1=p and k2= p2 of all the sub-extensions of F defined over p4. We give explicit examples with small prime numbers p.
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