Difference between revisions of "Ample field"

Latest revision as of 17:39, 12 November 2023

2020 Mathematics Subject Classification: Primary: 12E30 Secondary: 11R58 12F12 [MSN][ZBL]

A field $K$ is ample if and only if every absolutely irreducible curve over $K$ with a simple $K$-point has infinitely many $K$-points.

If $K$ is ample, then the inverse Galois problem for $K(T)$ is solved: every finite group occurs as a Galois group over $K(T)$.

A field is virtually ample if some finite extension is ample.

Moshe Jarden, "Algebraic patching", Springer (2011) ISBN 978-3-642-15127-9 Zbl 1235.12002
Pierre Dèbes, Bruno Deschamps, "The regular inverse Galois problem over large fields" in Schneps, Leila (ed.) et al., Geometric Galois actions 2", LMS Lecture Notes 243 Cambridge (1997) pp119-138 Zbl 0905.12004

How to Cite This Entry:
Ample field. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Ample_field&oldid=54424

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 ====References====
-* Moshe Jarden, "Algebraic patching", Springer (2011) ISBN 978-3-642-15127-9 {{ZBL|1235.12002}}
+* Moshe Jarden, "Algebraic patching", Springer (2011) {{ISBN|978-3-642-15127-9}} {{ZBL|1235.12002}}
 * Pierre Dèbes, Bruno Deschamps, "The regular inverse Galois problem over large fields" ''in ''Schneps, Leila (ed.) et al., Geometric Galois actions '''2'''", LMS Lecture Notes '''243''' Cambridge (1997) pp119-138 {{ZBL|0905.12004}}