The regular inverse Galois problem over non-large fields (Q1766230)
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scientific article; zbMATH DE number 2139678
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The regular inverse Galois problem over non-large fields |
scientific article; zbMATH DE number 2139678 |
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The regular inverse Galois problem over non-large fields (English)
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28 February 2005
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Summary: By a celebrated theorem of Harbater and Pop, the regular inverse Galois problem is solvable over any field containing a large field. Using this and the Mordell conjecture for function fields, we construct the first example of a field \(K\) over which the regular inverse Galois problem can be shown to be solvable, but such that \(K\) does not contain a large field. The paper is complemented by model-theoretic observations on the diophantine nature of the regular inverse Galois problem.
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regular inverse Galois problem
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embedding problems
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large fields: Mordell conjecture for function fields
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diophantine theory of fields
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