Quotients of the Hermitian curve from subgroups of PGU(3,q) without fixed points or triangles

Abstract

In this paper we deal with the problem of classifying the genera of quotient curves Hq/G, where Hq is the Fq2-maximal Hermitian curve and G is an automorphism group of Hq. The groups G considered in the literature fix either a point or a triangle in the plane PG(2,q6). In this paper, we give a complete list of genera of quotients Hq/G, when G ≤ Aut(Hq) PGU(3,q) does not leave invariant any point or triangle in the plane. As a result, the classification of subgroups G of PGU(3,q) satisfying this property is given up to isomorphism.