Topology of real Milnor fibration for non-isolated singularities

Abstract

We consider a real analytic map F=(f1,...,fk) : (Rn,0) → (Rk,0), 2 k n-1, that satisfies Milnor's conditions (a) and (b) introduced by D. Massey. This implies that every real analytic fI=(fi1,...,fil) : (Rn,0) → (Rl,0), induced from F by projections where 1 l n-2 and I=\i1,...,il\, also satisfies Milnor's conditions (a) and (b). We give several relations between the Euler characteristics of the Milnor fibre of F, the Milnor fibres of the maps fI, the link of F-1(0) and the links of fI-1(0).