Geometric motivic Poincar\'e series of quasi-ordinary singularities

Abstract

The geometric motivic Poincar\'e series of a germ (S,0) of complex algebraic variety takes into account the classes in the Grothendieck ring of the jets of arcs through (S,0). Denef and Loeser proved that this series has a rational form. We give an explicit description of this invariant when (S,0) is an irreducible germ of quasi-ordinary hypersurface singularity in terms of the Newton polyhedra of the logarithmic jacobian ideals. These ideals are determined by the characteristic monomials of a quasi-ordinary branch parametrizing (S,0).