Integration and Cell Decomposition in P-minimal Structures

Abstract

We show that the class of L-constructible functions is closed under integration for any P-minimal expansion of a p-adic field (K,L). This generalizes results previously known for semi-algebraic and sub-analytic structures. As part of the proof, we obtain a weak version of cell decomposition and function preparation for P-minimal structures, a result which is independent of the existence of Skolem functions. %The result is obtained from weak versions of cell decomposition and function preparation which we prove for general P-minimal structures. A direct corollary is that Denef's results on the rationality of Poincar\'e series hold in any P-minimal expansion of a p-adic field (K,L).