Volumes of definable sets in o-minimal expansions and affine GAGA theorems

Abstract

In this mostly expository note, I give a very quick proof of the definable Chow theorem of Peterzil and Starchenko using the Bishop-Stoll theorem and a volume estimate for definable sets due to Nguyen and Valette. The volume estimate says that any d-dimensional definable subset of S⊂eqRn in an o-minimal expansion of the ordered field of real numbers satisfies the inequality Hd(\x∈ S: x<r\)≤ Crd, where Hd denotes the d-dimensional Hausdorff measure on Rn and C is a constant depending on S. A closely related volume estimate for subanalytic sets goes back to Kurdyka and Raby. Since this note is intended to be helpful to algebraic geometers not versed in o-minimal structures and definable sets, I review these notions and also prove the main volume estimate from scratch.