The minimum genus of Galois covers of curves

Abstract

Let Y X be a G-Galois connected cover of smooth projective curves over an algebraically closed field k of positive characteristic p with the branch locus contained in a finite subset of closed points SX in X, where G is a finite cyclic p-group and l is a prime number other than p. Let Γ be an extension of an elementary abelian l-group H by G. We find G-stable submodules of l-torsion of the Picard group of Y and its generalisation. This is used to describe a method for finding the minimum genus of Γ-covers of X, étale over X SX, dominating Y; and also the minimum of the genera of Γ-covers of P1 étale over A1.