On the topology of complex map-germs and a general L\e-Greuel formula
Abstract
Consider a singular holomorphic map-germ f: (X,0) ( C,0) where X is a singular complex analytic variety in CN, and another holomorphic map-germ g: (X,0) ( C,0) which is "sufficiently good" relatively to f. We use stratified Morse theory to determine up to homeomorphism, the topology of the Milnor fiber Ff out from the slice Fg,f and the Morse data of a Morsification of the restriction of g to Ff. This generalizes classical results for the case where X is non-singular, and it provides a general formula comparing the Euler characteristics of Ff and Fg,f. Restricting to the case where the singularity of X at 0 is isolated, the formula for the difference of the Euler characteristics becomes algebraic and easily computable, generalizing in two directions the classical L\e-Greuel formula for the Milnor number of isolated complete intersection germs (ICIS): Firstly, X can have an isolated singularity, and secondly f can have arbitrary critical set. This unifies several known formulae in this vein: i) L\e-Greuel for ICIS of arbitrary codimension; ii) the formula relating the Milnor number of a curve with that of a function on it, and an extension of it for surfaces; iii) the formula for determinantal singularities; iv) and the one for the image Milnor number. All of these are special cases of our general formula.
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