Lebesgue classes and preparation of real constructible functions

Abstract

We call a function constructible if it has a globally subanalytic domain and can be expressed as a sum of products of globally subanalytic functions and logarithms of positively-valued globally subanalytic functions. For any q > 0 and constructible functions f and μ on E×n, we prove a theorem describing the structure of the set of all (x,p) in E × (0,∞] for which y f(x,y) is in Lp(|μ|xq), where |μ|xq is the positive measure on n whose Radon-Nikodym derivative with respect to the Lebesgue measure is y |μ(x,y)|q. We also prove a closely related preparation theorem for f and μ. These results relate analysis (the study of Lp-spaces) with geometry (the study of zero loci).