Transfer principles and the Kato-Kuzumaki conjecture
Abstract
We show that for tame valued fields of equal characteristic with divisible value group, the Ci property lifts from the residue field to the valued field under suitable hypotheses on the residue field. We apply this transfer principle to prove Kato-Kuzumaki's conjecture in full generality for several arithmetically significant fields, for instance the field C(x1,…,xm)(\!(t1)\!)…(\!(tn)\!), and the perfections of both Fp(x1,…,xm)(\!(t1)\!)…(\!(tn)\!) and Fp(\!(t1)\!)…(\!(tn)\!). Finally, we prove that Qp satisfies the strong C11 property, thereby answering a question of Wittenberg.
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