On plane curves given by separated polynomials and their automorphisms

Abstract

Let C be a plane curve defined over the algebraic closure K of a prime finite field Fp by a separated polynomial, that is C: A(y)=B(x), where A(y) is an additive polynomial of degree pn and the degree m of B(X) is coprime with p. Plane curves given by separated polynomials are well-known and studied in the literature. However just few informations are known on their automorphism groups. In this paper we compute the full automorphism group of C when m 1 pn and B(X) has just one root in K, that is B(X)=bm(X+bm-1/mbm)m for some bm,bm-1 ∈ K. Moreover, some sufficient conditions for the automorphism group of C to imply that B(X)=bm(X+bm-1/mbm)m are provided. As a byproduct, the full automorphism group of the Norm-Trace curve C: x(qr-1)/(q-1)=yqr-1+yqr-2+…+y is computed. Finally, these results are used to construct multi point AG codes with many automorphisms.