The Monodromy group of pq-covers

Abstract

In this work we study the monodromy group of covers of curves Y X P1, where is a q-fold cyclic \'etale cover and is a totally ramified p-fold cover, with p and q different prime numbers with p odd. We show that the Galois group G of the Galois closure Z of is of the form G = Zqs U, where 0 ≤ s ≤ p-1 and U is a simple transitive permutation group of degree p. Since the simple transitive permutation group of prime degree p are known, and we construct examples of such covers with these Galois groups, the result is very different from the previously known case when the cover was assumed to be cyclic, in which case the Galois group is of the form G = Zqs Zp. Furthermore, we are able to characterize the subgroups H and N of G such that Y = Z/N and X = Z/H.

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