J. Denef, F. Loeser
Published 1998-03-11Version 1
We study the scheme of formal arcs on a singular algebraic variety and its images under truncations. We prove a rationality result for the Poincare series of these images which is an analogue of the rationality of the Poincare series associated to p-adic points on a p-adic variety. The main tools which are used are semi-algebraic geometry in spaces of power series and motivic integration (a notion introduced by M. Kontsevich). In particular we develop the theory of motivic integration for semi-algebraic sets of formal arcs on singular algebraic varieties, we prove a change of variable formula for birational morphisms and we prove a geometric analogue of a result of Oesterle.
Comments: Revised Nov. 1997, to appear in Inventiones Mathematicae, 27 pages
Journal: Invent. Math. 135 (1999), no. 1, 201--232
Motivic integration, quotient singularities and the McKay correspondence
Arc spaces, motivic integration and stringy invariants
Poincare series and zeta function for an irreducible plane curve singularity
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