On the multiplicities of families of complex hypersurface-germs
Abstract
We show that the possible drop in multiplicity in an analytic family F(z,t) of complex analytic hypersurface singularities with constant Milnor number is controlled by the powers of t. We prove equimultiplicity of μ-constant families of the form f + tg + t2h if the singular set of the tangent cone of \f = 0 is not contained in the tangent cone of \h = 0.
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