Arturo Giles Flores
Published 2011-06-06Version 1
Let (X,0) be a reduced, equidimensional germ of analytic singularity with reduced tangent cone (C_{X,0},0). We prove that the absence of exceptional cones is a necessary and sufficient condition for the smooth part \X^0 of the specialization to the tangent cone \phi: \X \to \C to satisfy Whitney's conditions along the parameter axis Y. This result is a first step in generalizing to higher dimensions L\^e and Teissier's result for hypersurfaces of \C^3 which establishes the Whitney equisingularity of X and its tangent cone under this conditions.
Equisingularity of families of isolated determinantal singularities
Rationality and Parametrizations of Algebraic Curves under Specializations
Specialization of $F$-Zips
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