H\"older and Lipschitz continuity of functions definable over Henselian rank one valued fields

Abstract

Consider a Henselian rank one valued field K of equicharacteristic zero with the three-sorted language L of Denef--Pas. Let f: A K be a continuous L-definable (with parameters) function on a closed bounded subset A ⊂ Kn. The main purpose is to prove that then f is H\"older continuous with some exponent s≥ 0 and constant c ≥ 0, a fortiori, f is uniformly continuous. Further, if f is locally Lipschitz continuous with a constant c, then f is (globally) Lipschitz continuous with possibly some larger constant d. Also stated are some problems concerning continuous and Lipschitz continuous functions definable over Henselian valued fields.