The local dimension of a finite group over a number field
Abstract
Let G be a finite group and K a number field. We construct a G-extension E/F, with F of transcendence degree 2 over K, that specializes to all G-extensions of Kp, where p runs over all but finitely many primes of K. If furthermore G has a generic extension over K, we show that the extension E/F has the so-called Hilbert-Grunwald property. These results are compared to the notion of essential dimension of G over K, and its arithmetic analogue.
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