Local topology of a deformation of a function-germ with a one-dimensional critical set

Abstract

The Brasselet number of a function f with nonisolated singularities describes numerically the topological information of its generalized Milnor fibre. In this work, we consider two function-germs f,g:(X,0)→(C,0) such that f has isolated singularity at the origin and g has a stratified one-dimensional critical set. We use the Brasselet number to study the local topology a deformation g of g defined by g=g+fN, where N1 and N∈N. As an application of this study, we present a new proof of the L\e-Iomdin formula for the Brasselet number.