Finite A-determinacy of generic homogeneous map germs in C3

Abstract

Denote by H(d1,d2,d3) the set of all homogeneous polynomial mappings F=(f1,f2,f3): 33, such that fi=di. We show that if (di,dj)≤ 2 for 1≤ i<j≤ 3 and (d1,d2,d3)=1, then there is a non-empty Zariski open subset U⊂ H(d1,d2,d3) such that for every mapping F∈ U the map germ (F,0) is A-finitely determined. Moreover, in this case we compute the number of discrete singularities (0-stable singularities) of a generic mapping (f1,f2,f3):33, where fi=di.