The image Milnor number and excellent unfoldings

Abstract

We show three basic properties on the image Milnor number μI(f) of a germ f(Cn,S)→(Cn+1,0) with isolated instability. First, we show the conservation of the image Milnor number, from which one can deduce the upper semi-continuity and the topological invariance for families. Second, we prove the weak Mond's conjecture, which says that μI(f)=0 if and only if f is stable. Finally, we show a conjecture by Houston that any family ft(Cn,S)→(Cn+1,0) with μI(ft) constant is excellent in Gaffney's sense. By technical reasons, in the two last properties we consider only the corank 1 case.