Generic stability of linear algebraic groups over C[[t]]

Abstract

Let K be a henselian valued field with OK its valuation ring, its value group, and k its residue field. We study the definable subsets of OK and algebraic groups definable over OK in the case where k is algebraically closed and is a Z-group. We first describe the definable subsets of OK, showing that every definable subset of OK is either res-finite or res-cofinite (see Definition def-res-finite-cofinite). Applying this result, we show that GL(n, OK) (the invertible n by n matrices over OK) are generically stable for each n, generalizing Y. Halevi's result, where K is an algebraically closed valued field Y.Halevi.