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 $\mu$ on $E\times\RRn$, we prove a theorem describing the structure of the set of all $(x,p)$ in $E \times (0,\infty]$ for which $y \mapsto f(x,y)$ is in $Lp(|\mu|_{x}{q})$, where $|\mu|_{x}{q}$ is the positive measure on $\RRn$ whose Radon-Nikodym derivative with respect to the Lebesgue measure is $y\mapsto |\mu(x,y)|q$. We also prove a closely related preparation theorem for $f$ and $\mu$. These results relate analysis (the study of $Lp$-spaces) with geometry (the study of zero loci).
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