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arxiv: 0803.1756 · v2 · submitted 2008-03-12 · 🧮 math.AG · math.CV

Equisingularity of families of hypersurfaces and applications to mappings

classification 🧮 math.AG math.CV
keywords equisingularitysingularitiesfamilyhypersurfacewhitneyapplicationsisolatedmappings
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In the study of equisingularity of isolated singularities we have the classical theorem of Briancon, Speder and Teissier which states that a family of isolated hypersurface singularities is Whitney equisingular if and only if the mu^*-sequence for a hypersurface is constant in the family. In this paper we generalize to non-isolated hypersurface singularities. By assuming non-contractibility of strata of a Whitney stratification of the non-isolated singularities outside the origin we show that Whitney equisingularity of a family is equivalent to constancy of a certain selection of invariants from two distinct generalizations of the mu^*-sequence. Applications of this theorem to equisingularity of more general mappings are given.

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