Valued fields with a total residue map

Abstract

When k is a finite field, Becker-Denef-Lipschitz (1979) observed that the total residue map res:k(\!(t)\!) k, which picks out the constant term of the Laurent series, is definable in the language of rings with a parameter for t. Driven by this observation, we study the theory VFres, of valued fields equipped with a linear form res:K k which specializes to the residue map on the valuation ring. We prove that VFres, does not admit a model companion. In addition, we show that the power series field (k(\!(t)\!),res), equipped with such a total residue map, is undecidable whenever k is an infinite field. As a consequence, we get that (C(\!(t)\!), Res0) is undecidable, where Res0:C(\!(t)\!) C:f Res0(f) maps f to its complex residue at 0.