Counting D4 singularities in the image of a wave front

Abstract

We give a formula to count the number of D4 singularities in a stable frontal perturbation of a corank 2 wave front singularity f (C3,0) (C4,0) using Mond's method of stable perturbations of map germs. For a generic germ of corank 2 wave front f (C3,S) (C4,0), the image of a stable deformation ft of f exhibits Ak singularities with k ≤ 4, their transverse intersections and the aforementioned D4 singularities for 0 < |t| 1. By interpreting the image of ft as the discriminant (the image of the critical point set) of a smooth map germ Ht (C5,0) (C4,0), we define an algebra whose dimension over C is equal to the number of D4 points in the image of ft.