Motivic integrals and functional equations

Details Motivic integrals and functional equations Motivic integrals and functional equations

2006-06-21

arxiv.org/abs/math/0606521v2

Mathematics

Algebraic Geometry

16 pages, misprints corrected

Scientific paper

A functional equation for the motivic integral corresponding to the Milnor number of an arc is derived using the Denef-Loeser formula for the change of variables. Its solution is a function of five auxiliary parameters, it is unique up to multiplication by a constant and there is a simple recursive algorithm to find its coefficients. The method is universal enough and gives, for example, equations for the integral corresponding to the intersection number over the space of pairs of arcs and over the space of unordered tuples of arcs.

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