Motivic generating series for toric surface singularities
Abstract
Lejeune-Jalabert and Reguera computed the geometric Poincare series Pgeom(T) for toric surface singularities. They raise the question whether this series equals the arithmetic Poincare series. We prove this equality for a class of toric varieties including the surfaces, and construct a counterexample in the general case. We also compute the motivic Igusa Poincare series Qgeom(T) for toric surface singularities, using the change of variables formula for motivic integrals, thus answering a second question of Lejeune-Jalabert and Reguera's. The series Qgeom(T) contains more information than the geometric series, since it determines the multiplicity of the singularity. In some sense, this is the only difference between Qgeom(T) and Pgeom(T).
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