On residual domination and types orthogonal to the value group
Abstract
We present a unifying framework of residual domination for (expansions of) henselian valued fields of equicharacteristic zero, encompassing some valued fields with operators. We show that the class of residually dominated types coincides with the types that are orthogonal to the value group, and with the class of types whose reduct to ACVF (the theory of algebraically closed valued fields with a non-trivial valuation) are generically stable. When the residue field is stable (resp. simple) we relate these equivalent notions to generic stability (resp. simplicity). Those results apply in particular to ultraproducts of p-adic fields and to the limit theory VFA0 of algebraically closed valued fields of characteristic p with the Frobenius automorphism (as p tends to infinity).
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