An Fp2-maximal Wiman's sextic and its automorphisms

Abstract

In 1895 Wiman introduced a Riemann surface W of genus 6 over the complex field C defined by the homogeneous equation W:X6+Y6+Z6+(X2+Y2+Z2)(X4+Y4+Z4)-12X2 Y2 Z2=0, and showed that its full automorphism group is isomorphic to the symmetric group S5. The curve W was previously studied as a curve defined over a finite field Fp2 where p is a prime, and necessary and sufficient conditions for its maximality over Fp2 were obtained. In this paper we first show that the result of Wiman concerning the automorphism group of W holds also over an algebraically closed field K of positive characteristic p, provided that p ≥ 7. For p=2,3 the polynomial X6+Y6+Z6+(X2+Y2+Z2)(X4+Y4+Z4)-12X2 Y2 Z2 is not irreducible over K, while for p=5 the curve W is rational and Aut(W) PGL(2,K). We also show that the F192-maximal Wiman's sextic W is not Galois covered by the Hermitian curve H19 over F192.