Coincidence of dimensions in closed ordered differential fields

Abstract

Let K= R, δ be a closed ordered differential field, in the sense of M. Singer, and C its field of constants. In this note, we prove that, for sets definable in the pair M= R, C, the δ-dimension and the large dimension coincide. As an application, we characterize the definable sets in K that are internal to C as those sets that are definable in M and have δ-dimension 0. We further show that, for sets definable in K, having δ-dimension 0 does not generally imply co-analyzability in C (in contrast to the case of transseries). We also point out that the coincidence of dimensions also holds in the context of differentially closed fields and in the context of transseries.