On the Nash modification of a germ of complex analytic singularity

Abstract

For a germ (X,0) ⊂ (Cn,0) of reduced, equidimensional complex analytic singularity its Nash modification can be constructed as an analytic subvariety Z ⊂ Cn × G(k,n). We give a characterization of the subvarieties of Cn × G(k,n) that are the Nash modification of its image under the projection to Cn. This result generalizes the characterization of conormal varieties as Legendrian subvarieties of Cn × Pn-1 with its canonical contact structure. As a by-product we define the d-conormal space of (X,0) for any d ∈ \k, …, n-1\ which is a generalization of both the Nash modification and the conormal variety of (X,0).