Jet schemes of quasi-ordinary surface singularities

Abstract

In this paper we give a complete description of the irreducible components of the jet schemes (with origin in the singular locus) of a two-dimensional quasi-ordinary hypersurface singularity. We associate with these components and with their codimensions and embedding dimensions, a weighted graph. We prove that the data of this weighted graph is equivalent to the data of the topological type of the singularity. We also determine a component of the jet schemes (or equivalently, a divisor on A3), that computes the log canonical threshold of the singularity embedded in A3. This provides us with pairs X⊂A3 whose log canonical thresholds are not contributed by monomial divisorial valuations. Note that for a pair C⊂A2, where C is a plane curve, the log canonical threshold is always contributed by a monomial divisorial valuation (in suitable coordinates of A2).