The Geometry of the Artin-Schreier-Mumford Curves over an Algebraically Closed Field

Abstract

For a power q of a prime p, the Artin-Schreier-Mumford curve ASM(q) of genus g=(q-1)2 is the nonsingular model X of the irreducible plane curve with affine equation (Xq+X)(Yq+Y)=c,\, c≠ 0, defined over a field K of characteristic p. The Artin-Schreier-Mumford curves are known from the study of algebraic curves defined over a non-Archimedean valuated field since for |c|<1 they are curves with a large solvable automorphism group of order 2(q-1)q2 =2g(g+1)2, far away from the Hurwitz bound 84(g-1) valid in zero characteristic. In this paper we deal with the case where K is an algebraically closed field of characteristic p. We prove that the group Aut(X) of all automorphisms of X fixing K elementwise has order 2q2(q-1) and it is the semidirect product Q Dq-1 where Q is an elementary abelian group of order q2 and Dq-1 is a dihedral group of order 2(q-1). For the special case q=p, this result was proven by Valentini and Madan. Furthermore, we show that ASM(q) has a nonsingular model Y in the three-dimensional projective space PG(3,K) which is neither classical nor Frobenius classical over the finite field Fq2.