2010
DOI: 10.1017/s1446788710000108
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Finite Groups as Galois Groups of Function Fields With Infinite Field of Constants

Abstract: Let E/k be a function field over an infinite field of constants. Assume that E/k(x) is a separable extension of degree greater than one such that there exists a place of degree one of k(x) ramified in E. Let K /k be a function field. We prove that there exist infinitely many nonisomorphic separable

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