On invariants of a map germ from n-space to 2n-space

Abstract

We consider A-finite map germs f from (Cn,0) to (C2n,0). First, we show that the number of double points that appears in a stabilization of f, denoted by d(f), can be calculated as the length of the local ring of the double point set D2(f) of f, given by the Mond's ideal. In the case where n≤ 3 and f is quasihomogeneous, we also present a formula to calculate d(f) in terms of the weights and degrees of f. Finally, we consider an unfolding F(x,t) = (ft(x),t) of f and we find a set of invariants whose constancy in the family ft is equivalent to the Whitney equisingularity of F. As an application, we present a formula to calculate the Euler obstruction of the image of f.