SU\G(𝔸)/K·U

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Ultrasolvable embedding problems for number fields

Ultrasolvable embedding problems for number fields

It is proved that the existence of an ultrasolvable embedding problem $(K/k,\varphi )$ for finite extensions of the field of $p$-adic numbers implies the existence of an ultrasolvable embedding problem $(K/k,\varphi )$ for finite extensions of the field of rational numbers.