Semi-direct Galois covers of the affine line
Abstract
Let k be an algebraically closed field of characteristic p>0. Let G be Z/ Z semi-direct product Z/pZ where is a prime distinct from p. In this paper, we study Galois covers :Z P1k ramified only over ∞ with Galois group G. We find the minimal genus of a curve Z that admits such a cover and show that it depends only on , p, and the order a of modulo p. We also prove that the number of curves Z of this minimal genus which admit such a cover is at most (p-1)/a.
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