Galois theory over rings of arithmetic power series |
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| Authors: | Arno Fehm Elad Paran |
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| Affiliation: | aTel Aviv University, Israel;bHebrew University of Jerusalem, Israel |
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| Abstract: | ![]()
Let R be a domain, complete with respect to a norm which defines a non-discrete topology on R. We prove that the quotient field of R is ample, generalizing a theorem of Pop. We then consider the case where R is a ring of arithmetic power series which are holomorphic on the closed disc of radius 0<r<1 around the origin, and apply the above result to prove that the absolute Galois group of the quotient field of R is semi-free. This strengthens a theorem of Harbater, who solved the inverse Galois problem over these fields. |
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| Keywords: | Galois theory Power series Ample fields Large fields Split embedding problems Semi-free profinite groups |
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